{-# OPTIONS -fglasgow-exts -cpp #-} {-# OPTIONS -fno-warn-overlapping-patterns #-} module GF.Grammar.Parser ( P, runP , pModDef , pModHeader , pExp ) where import GF.Infra.Ident import GF.Infra.Modules import GF.Infra.Option import GF.Data.Operations import GF.Grammar.Predef import GF.Grammar.Grammar import GF.Grammar.Macros import GF.Grammar.Lexer import qualified Data.ByteString.Char8 as BS import GF.Compile.Update (buildAnyTree) #if __GLASGOW_HASKELL__ >= 503 import Data.Array #else import Array #endif #if __GLASGOW_HASKELL__ >= 503 import GHC.Exts #else import GlaExts #endif -- parser produced by Happy Version 1.16 newtype HappyAbsSyn = HappyAbsSyn (() -> ()) happyIn6 :: (SourceModule) -> (HappyAbsSyn ) happyIn6 x = unsafeCoerce# x {-# INLINE happyIn6 #-} happyOut6 :: (HappyAbsSyn ) -> (SourceModule) happyOut6 x = unsafeCoerce# x {-# INLINE happyOut6 #-} happyIn7 :: (SourceModule) -> (HappyAbsSyn ) happyIn7 x = unsafeCoerce# x {-# INLINE happyIn7 #-} happyOut7 :: (HappyAbsSyn ) -> (SourceModule) happyOut7 x = unsafeCoerce# x {-# INLINE happyOut7 #-} happyIn8 :: (ModuleStatus) -> (HappyAbsSyn ) happyIn8 x = unsafeCoerce# x {-# INLINE happyIn8 #-} happyOut8 :: (HappyAbsSyn ) -> (ModuleStatus) happyOut8 x = unsafeCoerce# x {-# INLINE happyOut8 #-} happyIn9 :: ((ModuleType Ident,Ident)) -> (HappyAbsSyn ) happyIn9 x = unsafeCoerce# x {-# INLINE happyIn9 #-} happyOut9 :: (HappyAbsSyn ) -> ((ModuleType Ident,Ident)) happyOut9 x = unsafeCoerce# x {-# INLINE happyOut9 #-} happyIn10 :: (( [(Ident,MInclude Ident)] , Maybe (Ident,MInclude Ident,[(Ident,Ident)]) , [OpenSpec Ident] )) -> (HappyAbsSyn ) happyIn10 x = unsafeCoerce# x {-# INLINE happyIn10 #-} happyOut10 :: (HappyAbsSyn ) -> (( [(Ident,MInclude Ident)] , Maybe (Ident,MInclude Ident,[(Ident,Ident)]) , [OpenSpec Ident] )) happyOut10 x = unsafeCoerce# x {-# INLINE happyOut10 #-} happyIn11 :: ([OpenSpec Ident]) -> (HappyAbsSyn ) happyIn11 x = unsafeCoerce# x {-# INLINE happyIn11 #-} happyOut11 :: (HappyAbsSyn ) -> ([OpenSpec Ident]) happyOut11 x = unsafeCoerce# x {-# INLINE happyOut11 #-} happyIn12 :: (( [(Ident,MInclude Ident)] , Maybe (Ident,MInclude Ident,[(Ident,Ident)]) , Maybe ([OpenSpec Ident],[(Ident,SrcSpan,Info)],Options) )) -> (HappyAbsSyn ) happyIn12 x = unsafeCoerce# x {-# INLINE happyIn12 #-} happyOut12 :: (HappyAbsSyn ) -> (( [(Ident,MInclude Ident)] , Maybe (Ident,MInclude Ident,[(Ident,Ident)]) , Maybe ([OpenSpec Ident],[(Ident,SrcSpan,Info)],Options) )) happyOut12 x = unsafeCoerce# x {-# INLINE happyOut12 #-} happyIn13 :: (([OpenSpec Ident],[(Ident,SrcSpan,Info)],Options)) -> (HappyAbsSyn ) happyIn13 x = unsafeCoerce# x {-# INLINE happyIn13 #-} happyOut13 :: (HappyAbsSyn ) -> (([OpenSpec Ident],[(Ident,SrcSpan,Info)],Options)) happyOut13 x = unsafeCoerce# x {-# INLINE happyOut13 #-} happyIn14 :: ([Either [(Ident,SrcSpan,Info)] Options]) -> (HappyAbsSyn ) happyIn14 x = unsafeCoerce# x {-# INLINE happyIn14 #-} happyOut14 :: (HappyAbsSyn ) -> ([Either [(Ident,SrcSpan,Info)] Options]) happyOut14 x = unsafeCoerce# x {-# INLINE happyOut14 #-} happyIn15 :: ([OpenSpec Ident]) -> (HappyAbsSyn ) happyIn15 x = unsafeCoerce# x {-# INLINE happyIn15 #-} happyOut15 :: (HappyAbsSyn ) -> ([OpenSpec Ident]) happyOut15 x = unsafeCoerce# x {-# INLINE happyOut15 #-} happyIn16 :: (OpenSpec Ident) -> (HappyAbsSyn ) happyIn16 x = unsafeCoerce# x {-# INLINE happyIn16 #-} happyOut16 :: (HappyAbsSyn ) -> (OpenSpec Ident) happyOut16 x = unsafeCoerce# x {-# INLINE happyOut16 #-} happyIn17 :: ([(Ident,Ident)]) -> (HappyAbsSyn ) happyIn17 x = unsafeCoerce# x {-# INLINE happyIn17 #-} happyOut17 :: (HappyAbsSyn ) -> ([(Ident,Ident)]) happyOut17 x = unsafeCoerce# x {-# INLINE happyOut17 #-} happyIn18 :: ((Ident,Ident)) -> (HappyAbsSyn ) happyIn18 x = unsafeCoerce# x {-# INLINE happyIn18 #-} happyOut18 :: (HappyAbsSyn ) -> ((Ident,Ident)) happyOut18 x = unsafeCoerce# x {-# INLINE happyOut18 #-} happyIn19 :: ([(Ident,MInclude Ident)]) -> (HappyAbsSyn ) happyIn19 x = unsafeCoerce# x {-# INLINE happyIn19 #-} happyOut19 :: (HappyAbsSyn ) -> ([(Ident,MInclude Ident)]) happyOut19 x = unsafeCoerce# x {-# INLINE happyOut19 #-} happyIn20 :: ((Ident,MInclude Ident)) -> (HappyAbsSyn ) happyIn20 x = unsafeCoerce# x {-# INLINE happyIn20 #-} happyOut20 :: (HappyAbsSyn ) -> ((Ident,MInclude Ident)) happyOut20 x = unsafeCoerce# x {-# INLINE happyOut20 #-} happyIn21 :: (Either [(Ident,SrcSpan,Info)] Options) -> (HappyAbsSyn ) happyIn21 x = unsafeCoerce# x {-# INLINE happyIn21 #-} happyOut21 :: (HappyAbsSyn ) -> (Either [(Ident,SrcSpan,Info)] Options) happyOut21 x = unsafeCoerce# x {-# INLINE happyOut21 #-} happyIn22 :: ([(Ident,SrcSpan,Info)]) -> (HappyAbsSyn ) happyIn22 x = unsafeCoerce# x {-# INLINE happyIn22 #-} happyOut22 :: (HappyAbsSyn ) -> ([(Ident,SrcSpan,Info)]) happyOut22 x = unsafeCoerce# x {-# INLINE happyOut22 #-} happyIn23 :: ([(Ident,SrcSpan,Info)]) -> (HappyAbsSyn ) happyIn23 x = unsafeCoerce# x {-# INLINE happyIn23 #-} happyOut23 :: (HappyAbsSyn ) -> ([(Ident,SrcSpan,Info)]) happyOut23 x = unsafeCoerce# x {-# INLINE happyOut23 #-} happyIn24 :: ([(Ident,SrcSpan,Info)]) -> (HappyAbsSyn ) happyIn24 x = unsafeCoerce# x {-# INLINE happyIn24 #-} happyOut24 :: (HappyAbsSyn ) -> ([(Ident,SrcSpan,Info)]) happyOut24 x = unsafeCoerce# x {-# INLINE happyOut24 #-} happyIn25 :: ([(Ident,SrcSpan,Info)]) -> (HappyAbsSyn ) happyIn25 x = unsafeCoerce# x {-# INLINE happyIn25 #-} happyOut25 :: (HappyAbsSyn ) -> ([(Ident,SrcSpan,Info)]) happyOut25 x = unsafeCoerce# x {-# INLINE happyOut25 #-} happyIn26 :: ([(Ident,SrcSpan,Info)]) -> (HappyAbsSyn ) happyIn26 x = unsafeCoerce# x {-# INLINE happyIn26 #-} happyOut26 :: (HappyAbsSyn ) -> ([(Ident,SrcSpan,Info)]) happyOut26 x = unsafeCoerce# x {-# INLINE happyOut26 #-} happyIn27 :: ([(Ident,SrcSpan,Info)]) -> (HappyAbsSyn ) happyIn27 x = unsafeCoerce# x {-# INLINE happyIn27 #-} happyOut27 :: (HappyAbsSyn ) -> ([(Ident,SrcSpan,Info)]) happyOut27 x = unsafeCoerce# x {-# INLINE happyOut27 #-} happyIn28 :: ([(Ident,SrcSpan,Info)]) -> (HappyAbsSyn ) happyIn28 x = unsafeCoerce# x {-# INLINE happyIn28 #-} happyOut28 :: (HappyAbsSyn ) -> ([(Ident,SrcSpan,Info)]) happyOut28 x = unsafeCoerce# x {-# INLINE happyOut28 #-} happyIn29 :: ([(Ident,SrcSpan,Term)]) -> (HappyAbsSyn ) happyIn29 x = unsafeCoerce# x {-# INLINE happyIn29 #-} happyOut29 :: (HappyAbsSyn ) -> ([(Ident,SrcSpan,Term)]) happyOut29 x = unsafeCoerce# x {-# INLINE happyOut29 #-} happyIn30 :: (Options) -> (HappyAbsSyn ) happyIn30 x = unsafeCoerce# x {-# INLINE happyIn30 #-} happyOut30 :: (HappyAbsSyn ) -> (Options) happyOut30 x = unsafeCoerce# x {-# INLINE happyOut30 #-} happyIn31 :: ([Ident]) -> (HappyAbsSyn ) happyIn31 x = unsafeCoerce# x {-# INLINE happyIn31 #-} happyOut31 :: (HappyAbsSyn ) -> ([Ident]) happyOut31 x = unsafeCoerce# x {-# INLINE happyOut31 #-} happyIn32 :: (Param) -> (HappyAbsSyn ) happyIn32 x = unsafeCoerce# x {-# INLINE happyIn32 #-} happyOut32 :: (HappyAbsSyn ) -> (Param) happyOut32 x = unsafeCoerce# x {-# INLINE happyOut32 #-} happyIn33 :: ([(Ident,SrcSpan,Info)]) -> (HappyAbsSyn ) happyIn33 x = unsafeCoerce# x {-# INLINE happyIn33 #-} happyOut33 :: (HappyAbsSyn ) -> ([(Ident,SrcSpan,Info)]) happyOut33 x = unsafeCoerce# x {-# INLINE happyOut33 #-} happyIn34 :: ([(Ident,SrcSpan,Info)]) -> (HappyAbsSyn ) happyIn34 x = unsafeCoerce# x {-# INLINE happyIn34 #-} happyOut34 :: (HappyAbsSyn ) -> ([(Ident,SrcSpan,Info)]) happyOut34 x = unsafeCoerce# x {-# INLINE happyOut34 #-} happyIn35 :: ([(Ident,SrcSpan,Info)]) -> (HappyAbsSyn ) happyIn35 x = unsafeCoerce# x {-# INLINE happyIn35 #-} happyOut35 :: (HappyAbsSyn ) -> ([(Ident,SrcSpan,Info)]) happyOut35 x = unsafeCoerce# x {-# INLINE happyOut35 #-} happyIn36 :: ([(Ident,SrcSpan,Info)]) -> (HappyAbsSyn ) happyIn36 x = unsafeCoerce# x {-# INLINE happyIn36 #-} happyOut36 :: (HappyAbsSyn ) -> ([(Ident,SrcSpan,Info)]) happyOut36 x = unsafeCoerce# x {-# INLINE happyOut36 #-} happyIn37 :: ([(Ident,SrcSpan,Info)]) -> (HappyAbsSyn ) happyIn37 x = unsafeCoerce# x {-# INLINE happyIn37 #-} happyOut37 :: (HappyAbsSyn ) -> ([(Ident,SrcSpan,Info)]) happyOut37 x = unsafeCoerce# x {-# INLINE happyOut37 #-} happyIn38 :: ([(Ident,SrcSpan,Info)]) -> (HappyAbsSyn ) happyIn38 x = unsafeCoerce# x {-# INLINE happyIn38 #-} happyOut38 :: (HappyAbsSyn ) -> ([(Ident,SrcSpan,Info)]) happyOut38 x = unsafeCoerce# x {-# INLINE happyOut38 #-} happyIn39 :: ([(Ident,SrcSpan,Info)]) -> (HappyAbsSyn ) happyIn39 x = unsafeCoerce# x {-# INLINE happyIn39 #-} happyOut39 :: (HappyAbsSyn ) -> ([(Ident,SrcSpan,Info)]) happyOut39 x = unsafeCoerce# x {-# INLINE happyOut39 #-} happyIn40 :: ([(Ident,SrcSpan,Term)]) -> (HappyAbsSyn ) happyIn40 x = unsafeCoerce# x {-# INLINE happyIn40 #-} happyOut40 :: (HappyAbsSyn ) -> ([(Ident,SrcSpan,Term)]) happyOut40 x = unsafeCoerce# x {-# INLINE happyOut40 #-} happyIn41 :: (Options) -> (HappyAbsSyn ) happyIn41 x = unsafeCoerce# x {-# INLINE happyIn41 #-} happyOut41 :: (HappyAbsSyn ) -> (Options) happyOut41 x = unsafeCoerce# x {-# INLINE happyOut41 #-} happyIn42 :: ([Param]) -> (HappyAbsSyn ) happyIn42 x = unsafeCoerce# x {-# INLINE happyIn42 #-} happyOut42 :: (HappyAbsSyn ) -> ([Param]) happyOut42 x = unsafeCoerce# x {-# INLINE happyOut42 #-} happyIn43 :: ([Ident]) -> (HappyAbsSyn ) happyIn43 x = unsafeCoerce# x {-# INLINE happyIn43 #-} happyOut43 :: (HappyAbsSyn ) -> ([Ident]) happyOut43 x = unsafeCoerce# x {-# INLINE happyOut43 #-} happyIn44 :: (Ident) -> (HappyAbsSyn ) happyIn44 x = unsafeCoerce# x {-# INLINE happyIn44 #-} happyOut44 :: (HappyAbsSyn ) -> (Ident) happyOut44 x = unsafeCoerce# x {-# INLINE happyOut44 #-} happyIn45 :: ([Ident]) -> (HappyAbsSyn ) happyIn45 x = unsafeCoerce# x {-# INLINE happyIn45 #-} happyOut45 :: (HappyAbsSyn ) -> ([Ident]) happyOut45 x = unsafeCoerce# x {-# INLINE happyOut45 #-} happyIn46 :: ([(Ident, Maybe Type, Maybe Term)]) -> (HappyAbsSyn ) happyIn46 x = unsafeCoerce# x {-# INLINE happyIn46 #-} happyOut46 :: (HappyAbsSyn ) -> ([(Ident, Maybe Type, Maybe Term)]) happyOut46 x = unsafeCoerce# x {-# INLINE happyOut46 #-} happyIn47 :: ([(Ident, Maybe Type, Maybe Term)]) -> (HappyAbsSyn ) happyIn47 x = unsafeCoerce# x {-# INLINE happyIn47 #-} happyOut47 :: (HappyAbsSyn ) -> ([(Ident, Maybe Type, Maybe Term)]) happyOut47 x = unsafeCoerce# x {-# INLINE happyOut47 #-} happyIn48 :: (Term) -> (HappyAbsSyn ) happyIn48 x = unsafeCoerce# x {-# INLINE happyIn48 #-} happyOut48 :: (HappyAbsSyn ) -> (Term) happyOut48 x = unsafeCoerce# x {-# INLINE happyOut48 #-} happyIn49 :: (Term) -> (HappyAbsSyn ) happyIn49 x = unsafeCoerce# x {-# INLINE happyIn49 #-} happyOut49 :: (HappyAbsSyn ) -> (Term) happyOut49 x = unsafeCoerce# x {-# INLINE happyOut49 #-} happyIn50 :: (Term) -> (HappyAbsSyn ) happyIn50 x = unsafeCoerce# x {-# INLINE happyIn50 #-} happyOut50 :: (HappyAbsSyn ) -> (Term) happyOut50 x = unsafeCoerce# x {-# INLINE happyOut50 #-} happyIn51 :: (Term) -> (HappyAbsSyn ) happyIn51 x = unsafeCoerce# x {-# INLINE happyIn51 #-} happyOut51 :: (HappyAbsSyn ) -> (Term) happyOut51 x = unsafeCoerce# x {-# INLINE happyOut51 #-} happyIn52 :: (Term) -> (HappyAbsSyn ) happyIn52 x = unsafeCoerce# x {-# INLINE happyIn52 #-} happyOut52 :: (HappyAbsSyn ) -> (Term) happyOut52 x = unsafeCoerce# x {-# INLINE happyOut52 #-} happyIn53 :: (Term) -> (HappyAbsSyn ) happyIn53 x = unsafeCoerce# x {-# INLINE happyIn53 #-} happyOut53 :: (HappyAbsSyn ) -> (Term) happyOut53 x = unsafeCoerce# x {-# INLINE happyOut53 #-} happyIn54 :: (Term) -> (HappyAbsSyn ) happyIn54 x = unsafeCoerce# x {-# INLINE happyIn54 #-} happyOut54 :: (HappyAbsSyn ) -> (Term) happyOut54 x = unsafeCoerce# x {-# INLINE happyOut54 #-} happyIn55 :: ([Term]) -> (HappyAbsSyn ) happyIn55 x = unsafeCoerce# x {-# INLINE happyIn55 #-} happyOut55 :: (HappyAbsSyn ) -> ([Term]) happyOut55 x = unsafeCoerce# x {-# INLINE happyOut55 #-} happyIn56 :: ([Term]) -> (HappyAbsSyn ) happyIn56 x = unsafeCoerce# x {-# INLINE happyIn56 #-} happyOut56 :: (HappyAbsSyn ) -> ([Term]) happyOut56 x = unsafeCoerce# x {-# INLINE happyOut56 #-} happyIn57 :: (Patt) -> (HappyAbsSyn ) happyIn57 x = unsafeCoerce# x {-# INLINE happyIn57 #-} happyOut57 :: (HappyAbsSyn ) -> (Patt) happyOut57 x = unsafeCoerce# x {-# INLINE happyOut57 #-} happyIn58 :: (Patt) -> (HappyAbsSyn ) happyIn58 x = unsafeCoerce# x {-# INLINE happyIn58 #-} happyOut58 :: (HappyAbsSyn ) -> (Patt) happyOut58 x = unsafeCoerce# x {-# INLINE happyOut58 #-} happyIn59 :: (Patt) -> (HappyAbsSyn ) happyIn59 x = unsafeCoerce# x {-# INLINE happyIn59 #-} happyOut59 :: (HappyAbsSyn ) -> (Patt) happyOut59 x = unsafeCoerce# x {-# INLINE happyOut59 #-} happyIn60 :: (Ident) -> (HappyAbsSyn ) happyIn60 x = unsafeCoerce# x {-# INLINE happyIn60 #-} happyOut60 :: (HappyAbsSyn ) -> (Ident) happyOut60 x = unsafeCoerce# x {-# INLINE happyOut60 #-} happyIn61 :: ([(Label,Patt)]) -> (HappyAbsSyn ) happyIn61 x = unsafeCoerce# x {-# INLINE happyIn61 #-} happyOut61 :: (HappyAbsSyn ) -> ([(Label,Patt)]) happyOut61 x = unsafeCoerce# x {-# INLINE happyOut61 #-} happyIn62 :: (Label) -> (HappyAbsSyn ) happyIn62 x = unsafeCoerce# x {-# INLINE happyIn62 #-} happyOut62 :: (HappyAbsSyn ) -> (Label) happyOut62 x = unsafeCoerce# x {-# INLINE happyOut62 #-} happyIn63 :: (Ident) -> (HappyAbsSyn ) happyIn63 x = unsafeCoerce# x {-# INLINE happyIn63 #-} happyOut63 :: (HappyAbsSyn ) -> (Ident) happyOut63 x = unsafeCoerce# x {-# INLINE happyOut63 #-} happyIn64 :: ([(Label,Patt)]) -> (HappyAbsSyn ) happyIn64 x = unsafeCoerce# x {-# INLINE happyIn64 #-} happyOut64 :: (HappyAbsSyn ) -> ([(Label,Patt)]) happyOut64 x = unsafeCoerce# x {-# INLINE happyOut64 #-} happyIn65 :: ([Patt]) -> (HappyAbsSyn ) happyIn65 x = unsafeCoerce# x {-# INLINE happyIn65 #-} happyOut65 :: (HappyAbsSyn ) -> ([Patt]) happyOut65 x = unsafeCoerce# x {-# INLINE happyOut65 #-} happyIn66 :: ([Ident]) -> (HappyAbsSyn ) happyIn66 x = unsafeCoerce# x {-# INLINE happyIn66 #-} happyOut66 :: (HappyAbsSyn ) -> ([Ident]) happyOut66 x = unsafeCoerce# x {-# INLINE happyOut66 #-} happyIn67 :: (Ident) -> (HappyAbsSyn ) happyIn67 x = unsafeCoerce# x {-# INLINE happyIn67 #-} happyOut67 :: (HappyAbsSyn ) -> (Ident) happyOut67 x = unsafeCoerce# x {-# INLINE happyOut67 #-} happyIn68 :: ([Ident]) -> (HappyAbsSyn ) happyIn68 x = unsafeCoerce# x {-# INLINE happyIn68 #-} happyOut68 :: (HappyAbsSyn ) -> ([Ident]) happyOut68 x = unsafeCoerce# x {-# INLINE happyOut68 #-} happyIn69 :: ([Decl]) -> (HappyAbsSyn ) happyIn69 x = unsafeCoerce# x {-# INLINE happyIn69 #-} happyOut69 :: (HappyAbsSyn ) -> ([Decl]) happyOut69 x = unsafeCoerce# x {-# INLINE happyOut69 #-} happyIn70 :: ([Term]) -> (HappyAbsSyn ) happyIn70 x = unsafeCoerce# x {-# INLINE happyIn70 #-} happyOut70 :: (HappyAbsSyn ) -> ([Term]) happyOut70 x = unsafeCoerce# x {-# INLINE happyOut70 #-} happyIn71 :: ([Patt]) -> (HappyAbsSyn ) happyIn71 x = unsafeCoerce# x {-# INLINE happyIn71 #-} happyOut71 :: (HappyAbsSyn ) -> ([Patt]) happyOut71 x = unsafeCoerce# x {-# INLINE happyOut71 #-} happyIn72 :: (Case) -> (HappyAbsSyn ) happyIn72 x = unsafeCoerce# x {-# INLINE happyIn72 #-} happyOut72 :: (HappyAbsSyn ) -> (Case) happyOut72 x = unsafeCoerce# x {-# INLINE happyOut72 #-} happyIn73 :: ([Case]) -> (HappyAbsSyn ) happyIn73 x = unsafeCoerce# x {-# INLINE happyIn73 #-} happyOut73 :: (HappyAbsSyn ) -> ([Case]) happyOut73 x = unsafeCoerce# x {-# INLINE happyOut73 #-} happyIn74 :: ((Term,Term)) -> (HappyAbsSyn ) happyIn74 x = unsafeCoerce# x {-# INLINE happyIn74 #-} happyOut74 :: (HappyAbsSyn ) -> ((Term,Term)) happyOut74 x = unsafeCoerce# x {-# INLINE happyOut74 #-} happyIn75 :: ([(Term,Term)]) -> (HappyAbsSyn ) happyIn75 x = unsafeCoerce# x {-# INLINE happyIn75 #-} happyOut75 :: (HappyAbsSyn ) -> ([(Term,Term)]) happyOut75 x = unsafeCoerce# x {-# INLINE happyOut75 #-} happyIn76 :: ([Decl]) -> (HappyAbsSyn ) happyIn76 x = unsafeCoerce# x {-# INLINE happyIn76 #-} happyOut76 :: (HappyAbsSyn ) -> ([Decl]) happyOut76 x = unsafeCoerce# x {-# INLINE happyOut76 #-} happyIn77 :: ([Decl]) -> (HappyAbsSyn ) happyIn77 x = unsafeCoerce# x {-# INLINE happyIn77 #-} happyOut77 :: (HappyAbsSyn ) -> ([Decl]) happyOut77 x = unsafeCoerce# x {-# INLINE happyOut77 #-} happyIn78 :: (Posn) -> (HappyAbsSyn ) happyIn78 x = unsafeCoerce# x {-# INLINE happyIn78 #-} happyOut78 :: (HappyAbsSyn ) -> (Posn) happyOut78 x = unsafeCoerce# x {-# INLINE happyOut78 #-} happyInTok :: Token -> (HappyAbsSyn ) happyInTok x = unsafeCoerce# x {-# INLINE happyInTok #-} happyOutTok :: (HappyAbsSyn ) -> Token happyOutTok x = unsafeCoerce# x {-# INLINE happyOutTok #-} happyActOffsets :: HappyAddr happyActOffsets = HappyA# "\xcc\x04\xcc\x04\x3b\x00\xcc\x04\x92\x01\x00\x00\xb1\x04\xd7\x04\xd6\x04\x06\x00\x90\x01\xd1\x04\x00\x00\x00\x00\xcf\x04\x82\x01\xff\xff\x3b\x00\x00\x00\x95\x00\x97\x04\xa2\x00\xa2\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x3b\x00\x15\x02\x0d\x00\x96\x04\x91\x04\x15\x02\xbf\x04\xbd\x04\xdf\x01\xbc\x04\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xd4\x04\x92\x01\x8b\x04\xad\x04\x7c\x04\x7b\x04\x7a\x04\x78\x04\x75\x04\x74\x04\x3b\x00\x6e\x01\x3b\x00\x78\x01\x3b\x00\x60\x01\xac\x04\xcb\x01\xcb\x01\x19\x02\xa5\x04\x8c\x04\x71\x04\x9b\x04\xf5\xff\x70\x04\x99\x04\x8f\x04\x00\x00\x00\x00\x92\x04\x87\x04\x00\x00\x85\x04\xcb\x01\xcf\x01\x88\x04\x95\x04\x89\x04\xd4\x00\x00\x00\x55\x04\x48\x01\x48\x01\x00\x00\x44\x04\x41\x04\x00\x00\x00\x00\x00\x00\x00\x00\x79\x04\x3b\x00\x01\x00\x77\x04\xb3\x00\xb3\x00\xb3\x00\x77\x00\x3b\x00\x6c\x04\x77\x00\x3b\x00\x6f\x04\xb8\x00\x00\x00\x00\x00\x7a\x01\xcb\x01\x3a\x04\x00\x00\x00\x00\xcb\x01\xcb\x01\xcb\x01\x00\x00\x3d\x04\x00\x00\x00\x00\x38\x04\x6b\x04\x5b\x04\x61\x04\xc5\x00\x52\x04\xbf\x00\x00\x00\x63\x04\x54\x04\x82\x01\x2c\x01\x69\x00\x56\x04\x3b\x00\x00\x00\x00\x00\x3b\x00\x3b\x00\xcb\x01\x4f\x04\x00\x00\x00\x00\x3b\x00\x3b\x00\xa2\x00\x4b\x04\x00\x00\x1c\x04\x47\x04\x3b\x00\x1a\x04\x3b\x00\x3b\x00\x51\x04\x51\x04\xf9\x00\x3e\x04\x33\x04\x3c\x04\x0e\x01\x37\x04\x31\x04\x30\x04\xf8\x00\x3b\x00\x48\x01\x2c\x04\x35\x04\x00\x00\x00\x00\x11\x04\x0f\x04\x00\x00\xe8\xff\x00\x00\x00\x00\x28\x04\x20\x00\x02\x00\x97\x00\xfb\x03\xeb\x03\x02\x00\x00\x00\x16\x04\x15\x04\x82\x01\x00\x00\xe8\x03\x82\x01\x00\x00\x00\x00\x3b\x00\x3b\x00\x3b\x00\x00\x00\x48\x01\x48\x01\x3b\x00\x48\x01\x00\x00\x18\x04\x00\x00\x00\x00\xfd\x03\x00\x00\x48\x01\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x14\x04\x1d\x04\x00\x00\x21\x04\xde\x03\x00\x00\x00\x00\x00\x00\x00\x00\x48\x01\x00\x00\x00\x00\x00\x00\xcd\x03\x48\x01\x00\x00\x00\x00\xfa\x03\x02\x04\x00\x00\x0a\x04\x09\x00\xc9\x04\x02\x00\xe4\x03\x03\x04\xc6\x03\x00\x00\xf1\x03\xc9\x04\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xbc\x00\xc4\x03\x05\x04\xb8\x00\x00\x00\x00\x00\xd2\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xdd\x03\x3b\x00\x3b\x00\x00\x00\x00\x00\x00\x00\x00\x00\xf9\x03\xe6\x03\xdb\x03\xda\x03\x00\x00\x00\x00\x82\x01\x00\x00\x00\x00\x00\x00\xe7\x03\x00\x00\x00\x00\xd9\x03\xa9\x03\x00\x00\xe9\x03\xe8\xff\x00\x00\xad\x03\xe5\x03\xe0\x03\x94\x03\xbe\x03\x92\x03\x02\x00\x00\x00\x00\x00\x00\x00\x3b\x00\x3b\x00\x00\x00\x00\x00\x00\x00\x00\x00\x98\x03\xd0\x03\x00\x00\xc9\x03\x00\x00\x00\x00\xc1\x03\x00\x00\x8c\x03\xc0\x03\x00\x00\x5b\x00\xbf\x03\x00\x00\x5b\x00\x00\x00\xbd\x03\x00\x00\x5b\x00\xac\x03\x00\x00\x77\x03\xab\x03\x00\x00\x74\x03\xa6\x03\x00\x00\x5b\x00\xa5\x03\x00\x00\x73\x03\xa4\x03\x00\x00\x59\x00\x00\x00\x00\x00\xa1\x03\x02\x00\x97\x03\xc9\x04\x00\x00\x6c\x03\x5a\x03\xc6\x01\x6f\x02\x90\x03\x16\x01\x58\x03\x18\x01\x8b\x03\x56\x03\x00\x00\x5c\x02\x86\x03\x53\x03\x88\x03\x50\x03\x08\x00\x83\x03\x49\x02\x89\x03\x71\x03\x36\x02\x08\x00\x51\x01\x13\x02\x70\x03\x3b\x03\x00\x00\x00\x00\x51\x00\x7c\x03\x00\x00\x00\x00\x00\x00\x67\x03\x00\x00\x6a\x03\x76\x03\x46\x03\x75\x03\x6f\x03\x00\x00\x00\x00\x32\x03\x00\x00\x5f\x03\x00\x00\x00\x00\x00\x00\x1f\x03\x00\x00\x3b\x00\x3b\x00\x4c\x00\x52\x03\xee\xff\x00\x00\x00\x00\x00\x00\x3b\x00\x00\x00\x3b\x00\x51\x03\x00\x00\x3b\x00\x00\x00\x1c\x03\x00\x00\x48\x03\x3b\x00\x4c\x03\x00\x00\x17\x03\x3b\x00\x00\x00\x00\x00\xc6\x01\x00\x00\xff\xff\xc6\x01\x57\x03\x41\x03\x00\x00\x00\x00\x42\x03\x39\x03\x00\x00\x00\x00\x00\x00\x00\x00\x29\x03\x3b\x00\x00\x00\x00\x00\x00\x00\x00\x00\x3b\x00\x00\x00\x00\x00\x00\x00\x3b\x00\x00\x00\x00\x00\x34\x03\x1e\x03\x00\x00\xc6\x01\x51\x00\x11\x03\xf1\x02\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xcd\x02\x00\x00\x3b\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xca\x02\x00\x00\x00\x00\x3b\x00\xe4\x02\x00\x00\xb7\x02\xe1\x02\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xc7\x02\x00\x00\x00\x00\x00\x00"# happyGotoOffsets :: HappyAddr happyGotoOffsets = HappyA# "\x64\x00\x30\x03\xbe\x04\x92\x02\xda\x02\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x18\x02\x00\x00\x00\x00\x00\x00\x00\x00\xa6\x02\xc8\x02\xaa\x02\x00\x00\x00\x00\x76\x02\x07\x03\x04\x03\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xb7\x04\x93\x01\x63\x02\x00\x00\x00\x00\x7e\x01\x00\x00\x00\x00\xfd\xff\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xb5\x02\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x20\x03\x00\x00\xa1\x04\xd2\x01\x0a\x03\xfb\x02\x00\x00\x4f\x01\x3d\x01\x00\x00\x00\x00\x00\x00\x50\x02\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xa8\x01\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xab\x02\x77\x01\x00\x00\x00\x00\xdf\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x9a\x04\x8b\x02\x00\x00\x24\x02\xc3\x01\x1f\x01\x8e\x02\x84\x04\x00\x00\xd9\x04\x7d\x04\x00\x00\x9e\x00\x00\x00\x00\x00\x00\x00\x3a\x01\x3d\x02\x00\x00\x00\x00\x3a\x01\x3a\x01\x3a\x01\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x4c\x02\x1a\x02\x00\x00\x00\x00\x67\x04\x00\x00\x00\x00\xf0\x01\x60\x04\xd8\xff\x00\x00\x00\x00\x00\x00\x4a\x04\x43\x04\x02\x03\x00\x00\x00\x00\x65\x02\x00\x00\x2d\x04\xee\x01\x26\x04\x10\x04\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x1a\x02\x00\x00\x00\x00\x00\x00\x1a\x02\xf4\x02\xe5\x02\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xdc\x00\x00\x00\x00\x00\x00\x00\x00\x00\x22\x03\x00\x00\x00\x00\x00\x00\x6d\x02\x00\x00\x00\x00\x00\x00\xdd\x01\x00\x00\x00\x00\x39\x02\x00\x00\x00\x00\xde\x02\xa3\x02\x87\x02\x00\x00\xcf\x02\xf5\x02\x09\x04\xe7\x02\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xfe\x01\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x33\x01\x00\x00\x00\x00\x00\x00\xc9\x00\x95\x02\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xbf\x01\x0b\x03\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x3c\x01\x17\x00\x55\x00\x53\x00\x6a\x00\x1b\x00\x88\x00\xac\x00\xab\x00\x76\x00\x70\x00\x00\x00\xee\x02\xd9\x02\x8f\x01\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xf3\x03\xec\x03\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xc8\x01\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x3f\x02\x00\x00\x91\x02\x24\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x31\x02\x44\x02\x00\x00\x00\x00\x00\x00\x80\x02\xd6\x03\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xa9\x00\x8f\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x9b\x02\x00\x00\x00\x00\x81\x02\x00\x00\x00\x00\x00\x00\x7d\x02\x00\x00\x00\x00\x02\x02\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x6a\x02\x00\x00\x00\x00\x9a\x01\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x74\x02\x00\x00\x38\x01\x00\x00\x00\x00\x00\x00\x0f\x01\x05\x00\x00\x00\x00\x00\x42\x00\xba\x01\x00\x00\x00\x00\x00\x00\x3d\x00\x00\x00\x10\x00\x00\x00\xf8\xff\x95\x01\x00\x00\x79\x00\x00\x00\x00\x00\x7e\x00\x64\x01\x00\x00\x34\x00\xf7\x01\x62\x00\x00\x00\x00\x00\xa1\x01\x5f\x02\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x40\x02\x8b\x01\x37\x02\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x12\x01\x00\x00\xcf\x03\xb9\x03\x5c\x01\x00\x00\x8e\x01\x00\x00\x00\x00\x00\x00\xb2\x03\x00\x00\x9c\x03\x00\x00\x00\x00\x95\x03\x00\x00\x00\x00\x00\x00\x00\x00\x7f\x03\x00\x00\x00\x00\x3e\x01\x78\x03\x00\x00\x00\x00\xf1\x00\xf2\x01\xc1\x02\xed\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xbc\x01\xb1\x01\x00\x00\x62\x03\x81\x01\x00\x00\x75\x01\x56\x01\x5b\x03\x30\x01\xfe\x00\x00\x00\x45\x03\x00\x00\xea\x00\xd0\x00\x00\x00\xc3\x00\xcd\x00\x01\x01\x00\x00\xf6\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xc2\x00\x00\x00\x3e\x03\x00\x00\xb7\x00\x00\x00\x00\x00\x7d\x00\x00\x00\x00\x00\x00\x00\x41\x00\x8e\x00\x00\x00\x00\x00\x28\x03\x03\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xc7\xff\x00\x00\x00\x00\x00\x00\x00\x00\xc3\xff\x00\x00\x00\x00"# happyDefActions :: HappyAddr happyDefActions = HappyA# "\xfa\xff\xfa\xff\x00\x00\x00\x00\x00\x00\xf9\xff\x00\x00\x87\xff\x85\xff\x83\xff\x7c\xff\x70\xff\x6e\xff\x6c\xff\x00\x00\x00\x00\x00\x00\x2c\xff\x68\xff\x00\x00\x93\xff\x00\x00\x00\x00\x3d\xff\x3b\xff\x3a\xff\x3c\xff\x3e\xff\x00\x00\x00\x00\x93\xff\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x6a\xff\x69\xff\x6b\xff\x61\xff\x6d\xff\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x5f\xff\x00\x00\x00\x00\x93\xff\x5f\xff\x00\x00\x73\xff\x00\x00\x00\x00\x00\x00\x92\xff\x00\x00\x93\xff\x9c\xff\x00\x00\x00\x00\x30\xff\x00\x00\x31\xff\x32\xff\x00\x00\x00\x00\x67\xff\x00\x00\x5c\xff\x2b\xff\x00\x00\x00\x00\x00\x00\x6d\xff\x74\xff\x00\x00\x00\x00\x29\xff\x51\xff\x00\x00\x39\xff\x4d\xff\x49\xff\x48\xff\x47\xff\x4c\xff\x00\x00\x00\x00\x7b\xff\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x90\xff\x86\xff\x83\xff\x7c\xff\x93\xff\x8c\xff\x84\xff\x7d\xff\x7e\xff\x82\xff\x6f\xff\x00\x00\x40\xff\x8d\xff\x00\x00\x00\x00\x38\xff\x00\x00\x9c\xff\x00\x00\x28\xff\x58\xff\x52\xff\x00\x00\x00\x00\x4c\xff\x00\x00\x4f\xff\x00\x00\x60\xff\x63\xff\x2c\xff\x00\x00\x5c\xff\x00\x00\x65\xff\x64\xff\x00\x00\x00\x00\x00\x00\x00\x00\x88\xff\x00\x00\x00\x00\x00\x00\x93\xff\x00\x00\x00\x00\x71\xff\x72\xff\x00\x00\x25\xff\x00\x00\x47\xff\x4c\xff\x5e\xff\x00\x00\x00\x00\x4c\xff\x5f\xff\x00\x00\x00\x00\x00\x00\xf7\xff\xf6\xff\x00\x00\x00\x00\xf8\xff\xeb\xff\xfb\xff\xec\xff\xef\xff\xd6\xff\x00\x00\xd4\xff\x00\x00\x00\x00\x00\x00\x79\xff\x00\x00\x00\x00\x36\xff\x57\xff\x00\x00\x00\x00\x81\xff\x75\xff\x5f\xff\x00\x00\x00\x00\x78\xff\x00\x00\x00\x00\x00\x00\x00\x00\x95\xff\x96\xff\x91\xff\x8a\xff\x00\x00\x9b\xff\x00\x00\x2f\xff\x8e\xff\x8f\xff\x66\xff\x5b\xff\x00\x00\x2b\xff\x2a\xff\x00\x00\x00\x00\x44\xff\x53\xff\x45\xff\x55\xff\x29\xff\x50\xff\x4b\xff\x46\xff\x39\xff\x00\x00\x4a\xff\x3f\xff\x00\x00\xfc\xff\xe3\xff\xe6\xff\xd6\xff\xdf\xff\x00\x00\x00\x00\xdd\xff\x00\x00\xdb\xff\x00\x00\xdf\xff\x1c\xff\x1c\xff\x1c\xff\x1c\xff\x1c\xff\x1c\xff\x1c\xff\x1c\xff\x1c\xff\x1c\xff\x00\x00\x00\x00\x00\x00\x00\x00\xe2\xff\x89\xff\x41\xff\x37\xff\x27\xff\x4e\xff\x2e\xff\x62\xff\x00\x00\x00\x00\x00\x00\x5a\xff\x26\xff\x59\xff\x24\xff\x00\x00\x22\xff\x00\x00\x00\x00\x5d\xff\x54\xff\x4a\xff\x35\xff\x7f\xff\x80\xff\x00\x00\xf4\xff\xf5\xff\x00\x00\x00\x00\xea\xff\x00\x00\xeb\xff\xf0\xff\x00\x00\xed\xff\xd9\xff\x00\x00\x00\x00\x00\x00\x00\x00\x56\xff\x76\xff\x77\xff\x00\x00\x00\x00\x94\xff\x8b\xff\x7a\xff\xe7\xff\x00\x00\xe4\xff\xd5\xff\xd6\xff\x1c\xff\x1c\xff\x00\x00\xcd\xff\x00\x00\x00\x00\xcc\xff\x00\x00\x00\x00\xca\xff\x00\x00\xcb\xff\x00\x00\xc9\xff\x00\x00\x00\x00\xd0\xff\x00\x00\x00\x00\xc6\xff\x00\x00\x00\x00\xcf\xff\x00\x00\x00\x00\xce\xff\x00\x00\x00\x00\xd1\xff\x00\x00\xde\xff\xe1\xff\x00\x00\x00\x00\x00\x00\xdf\xff\xdc\xff\x00\x00\x00\x00\x1e\xff\x1c\xff\x00\x00\x9c\xff\xa6\xff\x98\xff\x00\x00\x00\x00\x9a\xff\x1c\xff\x00\x00\xa0\xff\x00\x00\xa8\xff\x98\xff\x00\x00\x1c\xff\x98\xff\x00\x00\x1c\xff\x98\xff\x00\x00\x1c\xff\x1c\xff\xa4\xff\xc7\xff\xc8\xff\x00\x00\x00\x00\x23\xff\x21\xff\xf3\xff\x00\x00\xd3\xff\x00\x00\x00\x00\xeb\xff\x00\x00\xf1\xff\xee\xff\xd8\xff\x00\x00\xd2\xff\xe8\xff\xe5\xff\xa3\xff\xbc\xff\x00\x00\xab\xff\x00\x00\x00\x00\x34\xff\x00\x00\x00\x00\x43\xff\x42\xff\xa1\xff\x00\x00\xaf\xff\x00\x00\x00\x00\xa7\xff\x00\x00\x9f\xff\x00\x00\xad\xff\x00\x00\x00\x00\x00\x00\xa5\xff\x00\x00\x00\x00\xa9\xff\x1f\xff\x1e\xff\x1c\xff\x00\x00\x1e\xff\x00\x00\x00\x00\xe0\xff\xda\xff\x00\x00\x00\x00\xc5\xff\x1d\xff\x1c\xff\x1c\xff\xb3\xff\x00\x00\x1c\xff\x99\xff\x1c\xff\x1c\xff\x00\x00\x1c\xff\x1c\xff\x97\xff\x00\x00\x33\xff\x1c\xff\x1c\xff\x9e\xff\x1c\xff\x1e\xff\x00\x00\x00\x00\xeb\xff\xf2\xff\xd7\xff\xe9\xff\xb1\xff\xbd\xff\x00\x00\xbb\xff\x00\x00\xba\xff\x1c\xff\xb5\xff\xb7\xff\x1c\xff\xc2\xff\xb4\xff\xc1\xff\x1c\xff\x00\x00\xbf\xff\xbe\xff\x00\x00\x1c\xff\xc4\xff\x00\x00\x00\x00\xb2\xff\xc0\xff\xb6\xff\xb9\xff\x1c\xff\x9d\xff\xb8\xff\x20\xff\x00\x00\x1c\xff\xc3\xff"# happyCheck :: HappyAddr happyCheck = HappyA# "\xff\xff\x02\x00\x0d\x00\x04\x00\x03\x00\x17\x00\x04\x00\x01\x00\x30\x00\x11\x00\x32\x00\x48\x00\x06\x00\x07\x00\x08\x00\x48\x00\x11\x00\x39\x00\x0a\x00\x0a\x00\x15\x00\x10\x00\x17\x00\x1f\x00\x19\x00\x13\x00\x1b\x00\x1c\x00\x1d\x00\x35\x00\x1f\x00\x20\x00\x21\x00\x22\x00\x23\x00\x1e\x00\x25\x00\x1d\x00\x19\x00\x10\x00\x18\x00\x05\x00\x0a\x00\x2c\x00\x11\x00\x30\x00\x46\x00\x30\x00\x31\x00\x32\x00\x0e\x00\x23\x00\x46\x00\x1e\x00\x39\x00\x38\x00\x39\x00\x44\x00\x1f\x00\x3c\x00\x3d\x00\x02\x00\x3f\x00\x04\x00\x48\x00\x42\x00\x43\x00\x44\x00\x45\x00\x46\x00\x40\x00\x46\x00\x46\x00\x15\x00\x41\x00\x48\x00\x11\x00\x48\x00\x46\x00\x12\x00\x15\x00\x1d\x00\x17\x00\x46\x00\x19\x00\x13\x00\x1b\x00\x1c\x00\x48\x00\x1c\x00\x1f\x00\x20\x00\x21\x00\x22\x00\x23\x00\x48\x00\x25\x00\x41\x00\x20\x00\x48\x00\x00\x00\x12\x00\x02\x00\x2c\x00\x13\x00\x1d\x00\x19\x00\x30\x00\x31\x00\x32\x00\x05\x00\x1c\x00\x17\x00\x08\x00\x17\x00\x38\x00\x39\x00\x20\x00\x14\x00\x3c\x00\x3d\x00\x02\x00\x3f\x00\x04\x00\x48\x00\x42\x00\x43\x00\x44\x00\x45\x00\x46\x00\x18\x00\x21\x00\x14\x00\x48\x00\x35\x00\x1e\x00\x11\x00\x48\x00\x48\x00\x15\x00\x15\x00\x23\x00\x17\x00\x16\x00\x19\x00\x21\x00\x46\x00\x1d\x00\x1b\x00\x17\x00\x1f\x00\x20\x00\x21\x00\x22\x00\x23\x00\x48\x00\x25\x00\x48\x00\x16\x00\x46\x00\x22\x00\x46\x00\x0b\x00\x1b\x00\x06\x00\x07\x00\x17\x00\x19\x00\x31\x00\x32\x00\x48\x00\x0d\x00\x0e\x00\x18\x00\x17\x00\x38\x00\x39\x00\x22\x00\x48\x00\x3c\x00\x3d\x00\x02\x00\x3f\x00\x04\x00\x48\x00\x42\x00\x43\x00\x44\x00\x45\x00\x46\x00\x48\x00\x1d\x00\x17\x00\x48\x00\x17\x00\x17\x00\x11\x00\x48\x00\x48\x00\x08\x00\x15\x00\x0a\x00\x17\x00\x22\x00\x19\x00\x22\x00\x22\x00\x0a\x00\x48\x00\x19\x00\x1f\x00\x20\x00\x21\x00\x22\x00\x23\x00\x48\x00\x25\x00\x44\x00\x08\x00\x46\x00\x1a\x00\x1e\x00\x0a\x00\x1a\x00\x04\x00\x05\x00\x26\x00\x0f\x00\x31\x00\x32\x00\x24\x00\x2b\x00\x46\x00\x0d\x00\x0e\x00\x38\x00\x39\x00\x35\x00\x25\x00\x3c\x00\x1e\x00\x48\x00\x3f\x00\x48\x00\x48\x00\x42\x00\x43\x00\x44\x00\x45\x00\x46\x00\x02\x00\x05\x00\x04\x00\x30\x00\x46\x00\x48\x00\x37\x00\x08\x00\x0a\x00\x3a\x00\x25\x00\x0d\x00\x39\x00\x0f\x00\x07\x00\x11\x00\x12\x00\x48\x00\x13\x00\x15\x00\x16\x00\x17\x00\x02\x00\x19\x00\x04\x00\x46\x00\x47\x00\x1d\x00\x37\x00\x1e\x00\x48\x00\x3a\x00\x02\x00\x0d\x00\x04\x00\x30\x00\x10\x00\x11\x00\x0a\x00\x30\x00\x0a\x00\x15\x00\x16\x00\x17\x00\x39\x00\x19\x00\x12\x00\x11\x00\x39\x00\x1d\x00\x1a\x00\x15\x00\x02\x00\x17\x00\x04\x00\x19\x00\x48\x00\x46\x00\x47\x00\x1d\x00\x24\x00\x46\x00\x47\x00\x0d\x00\x42\x00\x43\x00\x44\x00\x11\x00\x46\x00\x30\x00\x08\x00\x15\x00\x16\x00\x17\x00\x08\x00\x19\x00\x48\x00\x0f\x00\x39\x00\x1d\x00\x02\x00\x0f\x00\x04\x00\x2e\x00\x2f\x00\x30\x00\x42\x00\x43\x00\x44\x00\x0b\x00\x46\x00\x46\x00\x47\x00\x19\x00\x39\x00\x11\x00\x42\x00\x43\x00\x44\x00\x15\x00\x46\x00\x17\x00\x0f\x00\x19\x00\x02\x00\x12\x00\x04\x00\x1d\x00\x33\x00\x34\x00\x35\x00\x2f\x00\x30\x00\x0b\x00\x2f\x00\x30\x00\x42\x00\x43\x00\x44\x00\x11\x00\x46\x00\x39\x00\x41\x00\x15\x00\x39\x00\x17\x00\x48\x00\x19\x00\x02\x00\x01\x00\x04\x00\x1d\x00\x2f\x00\x30\x00\x06\x00\x07\x00\x08\x00\x0b\x00\x02\x00\x17\x00\x04\x00\x19\x00\x39\x00\x11\x00\x42\x00\x43\x00\x44\x00\x15\x00\x46\x00\x17\x00\x05\x00\x19\x00\x36\x00\x11\x00\x04\x00\x1d\x00\x07\x00\x15\x00\x3c\x00\x17\x00\x36\x00\x19\x00\x0c\x00\x0e\x00\x48\x00\x1d\x00\x3c\x00\x11\x00\x42\x00\x43\x00\x44\x00\x15\x00\x46\x00\x17\x00\x07\x00\x19\x00\x33\x00\x34\x00\x35\x00\x2f\x00\x30\x00\x1f\x00\x20\x00\x21\x00\x22\x00\x23\x00\x26\x00\x27\x00\x24\x00\x39\x00\x41\x00\x27\x00\x42\x00\x43\x00\x44\x00\x48\x00\x46\x00\x25\x00\x2e\x00\x2f\x00\x2f\x00\x30\x00\x42\x00\x43\x00\x44\x00\x08\x00\x46\x00\x48\x00\x04\x00\x36\x00\x39\x00\x3b\x00\x0f\x00\x04\x00\x3e\x00\x3c\x00\x42\x00\x43\x00\x44\x00\x45\x00\x46\x00\x11\x00\x30\x00\x0a\x00\x32\x00\x15\x00\x11\x00\x17\x00\x0f\x00\x19\x00\x15\x00\x39\x00\x17\x00\x04\x00\x19\x00\x1f\x00\x20\x00\x21\x00\x22\x00\x23\x00\x1f\x00\x20\x00\x21\x00\x22\x00\x23\x00\x35\x00\x11\x00\x2e\x00\x2f\x00\x30\x00\x15\x00\x3b\x00\x17\x00\x25\x00\x19\x00\x48\x00\x28\x00\x29\x00\x39\x00\x35\x00\x1f\x00\x20\x00\x21\x00\x22\x00\x23\x00\x3b\x00\x48\x00\x33\x00\x34\x00\x35\x00\x42\x00\x43\x00\x44\x00\x45\x00\x46\x00\x42\x00\x43\x00\x44\x00\x45\x00\x46\x00\x35\x00\x25\x00\x42\x00\x43\x00\x28\x00\x29\x00\x3b\x00\x04\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x42\x00\x43\x00\x44\x00\x45\x00\x46\x00\x11\x00\x25\x00\x0f\x00\x39\x00\x15\x00\x12\x00\x17\x00\x1a\x00\x19\x00\x3f\x00\x40\x00\x33\x00\x34\x00\x35\x00\x1f\x00\x20\x00\x21\x00\x22\x00\x23\x00\x26\x00\x48\x00\x28\x00\x29\x00\x2a\x00\x2b\x00\x48\x00\x42\x00\x43\x00\x0b\x00\x0c\x00\x31\x00\x32\x00\x33\x00\x2f\x00\x30\x00\x36\x00\x37\x00\x0b\x00\x0c\x00\x3a\x00\x0a\x00\x35\x00\x1a\x00\x39\x00\x2e\x00\x2f\x00\x30\x00\x3b\x00\x25\x00\x42\x00\x43\x00\x44\x00\x45\x00\x46\x00\x26\x00\x39\x00\x28\x00\x29\x00\x2a\x00\x2b\x00\x25\x00\x1a\x00\x25\x00\x28\x00\x29\x00\x31\x00\x32\x00\x33\x00\x0b\x00\x0c\x00\x36\x00\x37\x00\x35\x00\x26\x00\x3a\x00\x28\x00\x29\x00\x2a\x00\x2b\x00\x25\x00\x1a\x00\x0a\x00\x28\x00\x29\x00\x31\x00\x32\x00\x33\x00\x09\x00\x0a\x00\x36\x00\x37\x00\x35\x00\x26\x00\x3a\x00\x28\x00\x29\x00\x2a\x00\x2b\x00\x25\x00\x1a\x00\x25\x00\x28\x00\x29\x00\x31\x00\x32\x00\x33\x00\x26\x00\x27\x00\x36\x00\x37\x00\x02\x00\x26\x00\x3a\x00\x28\x00\x29\x00\x2a\x00\x2b\x00\x25\x00\x0b\x00\x0c\x00\x28\x00\x29\x00\x31\x00\x32\x00\x33\x00\x26\x00\x27\x00\x36\x00\x37\x00\x26\x00\x27\x00\x3a\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x03\x00\x39\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x3f\x00\x39\x00\x26\x00\x27\x00\x38\x00\x44\x00\x45\x00\x3f\x00\x39\x00\x33\x00\x34\x00\x35\x00\x44\x00\x45\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x35\x00\x39\x00\x03\x00\x33\x00\x34\x00\x35\x00\x1a\x00\x3f\x00\x39\x00\x0b\x00\x0c\x00\x05\x00\x44\x00\x45\x00\x3f\x00\x40\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x42\x00\x39\x00\x0d\x00\x0e\x00\x19\x00\x3d\x00\x3e\x00\x3f\x00\x39\x00\x33\x00\x34\x00\x35\x00\x3d\x00\x3e\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x31\x00\x46\x00\x42\x00\x43\x00\x46\x00\x09\x00\x0a\x00\x05\x00\x39\x00\x33\x00\x34\x00\x35\x00\x34\x00\x35\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x31\x00\x35\x00\x42\x00\x43\x00\x34\x00\x35\x00\x09\x00\x0a\x00\x39\x00\x33\x00\x34\x00\x35\x00\x01\x00\x02\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x31\x00\x1e\x00\x42\x00\x43\x00\x3d\x00\x3e\x00\x3d\x00\x3e\x00\x39\x00\x3d\x00\x3e\x00\x12\x00\x1e\x00\x0f\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x31\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x39\x00\x18\x00\x1a\x00\x05\x00\x46\x00\x12\x00\x3f\x00\x18\x00\x39\x00\x46\x00\x12\x00\x12\x00\x46\x00\x07\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x07\x00\x39\x00\x46\x00\x04\x00\x04\x00\x35\x00\x12\x00\x3f\x00\x39\x00\x18\x00\x04\x00\x46\x00\x12\x00\x12\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x0a\x00\x39\x00\x12\x00\x46\x00\x0f\x00\x12\x00\x46\x00\x3f\x00\x39\x00\x46\x00\x12\x00\x46\x00\x0f\x00\x46\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x19\x00\x39\x00\x46\x00\x12\x00\x10\x00\x10\x00\x10\x00\x3f\x00\x39\x00\x46\x00\x46\x00\x10\x00\x10\x00\x46\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x10\x00\x39\x00\x10\x00\x10\x00\x10\x00\x46\x00\x0a\x00\x3f\x00\x39\x00\x18\x00\x07\x00\x46\x00\x41\x00\x46\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x0a\x00\x39\x00\x07\x00\x04\x00\x41\x00\x46\x00\x17\x00\x3f\x00\x39\x00\x0c\x00\x1a\x00\x1a\x00\x10\x00\x1a\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x0e\x00\x39\x00\x04\x00\x46\x00\x1a\x00\x46\x00\x0a\x00\x3f\x00\x39\x00\x2c\x00\x07\x00\x10\x00\x46\x00\x1a\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x46\x00\x39\x00\x05\x00\x0a\x00\x14\x00\x2c\x00\x12\x00\x3f\x00\x39\x00\x18\x00\x46\x00\x07\x00\x1a\x00\x46\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x46\x00\x39\x00\x34\x00\x0f\x00\x34\x00\x1a\x00\x10\x00\x3f\x00\x39\x00\x1a\x00\x1a\x00\x10\x00\x1a\x00\x10\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x0d\x00\x39\x00\x46\x00\x1a\x00\x46\x00\x0d\x00\x19\x00\x3f\x00\x39\x00\x18\x00\x14\x00\x06\x00\x18\x00\x10\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x1a\x00\x39\x00\x12\x00\x46\x00\x42\x00\x46\x00\x12\x00\x3f\x00\x39\x00\x0d\x00\x19\x00\x0d\x00\x46\x00\x44\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x0f\x00\x39\x00\x05\x00\x46\x00\x14\x00\x18\x00\x0c\x00\x3f\x00\x39\x00\x1a\x00\x13\x00\x0a\x00\x34\x00\x0a\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x10\x00\x39\x00\x46\x00\x2c\x00\x0d\x00\x46\x00\x46\x00\x3f\x00\x39\x00\x46\x00\x12\x00\x46\x00\x46\x00\x46\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x47\x00\x39\x00\x00\x00\x19\x00\x19\x00\x46\x00\x19\x00\x3f\x00\x39\x00\x0c\x00\x46\x00\x46\x00\x0d\x00\x09\x00\x3f\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x2a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\x26\x00\x39\x00\x28\x00\x29\x00\x2a\x00\x2b\x00\x1e\x00\x3f\x00\x39\x00\x47\x00\x2d\x00\x31\x00\x32\x00\x33\x00\x3f\x00\xff\xff\x36\x00\x37\x00\xff\xff\xff\xff\x3a\x00\x2b\x00\x2c\x00\x2d\x00\x2e\x00\x2f\x00\x30\x00\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\x39\x00\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff\xff"# happyTable :: HappyAddr happyTable = HappyA# "\x00\x00\x10\x00\x61\x00\x11\x00\x78\x00\x68\x01\xf2\x00\x63\x00\x8d\x00\x48\x01\xd6\x00\xef\x01\x64\x00\x65\x00\x66\x00\xeb\x01\x12\x00\x0d\x00\x96\x01\x01\x01\x13\x00\x54\x01\x14\x00\x9d\x01\x15\x00\x67\x00\x16\x00\x17\x00\x48\x00\xb6\x00\x18\x00\x19\x00\x1a\x00\x1b\x00\x1c\x00\xa8\x01\x1d\x00\x97\x01\x42\x00\x54\x01\x4b\x01\x24\x01\x01\x01\x1e\x00\x48\x01\x36\x00\xb7\x00\x1f\x00\x20\x00\x21\x00\x25\x01\x9f\x01\x69\x01\x55\x01\x0d\x00\x22\x00\x23\x00\x96\x00\x49\x01\x24\x00\x25\x00\x10\x00\x26\x00\x11\x00\x4a\x01\x27\x00\x28\x00\x29\x00\x2a\x00\x53\x00\x68\x00\x79\x00\xf3\x00\x3e\x01\x02\x01\xe2\x01\x12\x00\x56\x01\x98\x01\x4e\x01\x13\x00\x90\x01\x14\x00\x43\x00\x15\x00\x51\x01\x16\x00\x17\x00\x4d\x01\xa1\x01\x18\x00\x19\x00\x1a\x00\x1b\x00\x1c\x00\x56\x01\x1d\x00\x23\x01\xa5\x01\x4a\x01\x2d\x00\x4e\x01\x04\x00\x1e\x00\x51\x01\x97\x01\xee\x00\x1f\x00\x20\x00\x21\x00\xdd\x00\x4f\x01\x60\x01\xc9\x00\x68\x01\x22\x00\x23\x00\x52\x01\x3b\x01\x24\x00\x25\x00\x10\x00\x26\x00\x38\x00\x40\x01\x27\x00\x28\x00\x29\x00\x2a\x00\x2b\x00\x4b\x01\x8d\x01\x3b\x01\x50\x01\xef\x00\xcb\x00\x12\x00\xe6\x01\x53\x01\x3e\x01\x13\x00\x4c\x01\x14\x00\x45\x01\x15\x00\x3c\x01\x98\x01\x3f\x01\x9a\x01\x41\x01\x18\x00\x19\x00\x1a\x00\x1b\x00\x1c\x00\x50\x01\x1d\x00\x53\x01\x45\x01\x61\x01\x98\x01\x69\x01\x20\x01\x46\x01\xe9\x00\xea\x00\x41\x01\xe5\x01\x20\x00\x21\x00\x3d\x01\xeb\x00\xec\x00\x4c\x00\x21\x01\x22\x00\x23\x00\x79\x01\x4d\x01\x24\x00\x25\x00\x10\x00\x26\x00\x38\x00\x3d\x01\x27\x00\x28\x00\x29\x00\x2a\x00\x2b\x00\x40\x01\x48\x00\x41\x01\x47\x01\x41\x01\x41\x01\x12\x00\xe7\x01\x43\x01\xc9\x00\x13\x00\xe1\x00\x14\x00\x7a\x01\x15\x00\x42\x01\x44\x01\x97\x00\x47\x01\xee\x00\x18\x00\x19\x00\x1a\x00\x1b\x00\x1c\x00\x43\x01\x1d\x00\x4d\x00\xc9\x00\x4e\x00\xc6\x01\xcb\x00\x32\xff\xe3\x00\xb1\x00\xb2\x00\x3a\x01\x32\xff\x20\x00\x21\x00\xea\x01\x3b\x01\x49\x00\xb3\x00\xb4\x00\x22\x00\x23\x00\xef\x00\x7b\x00\x24\x00\xcb\x00\x43\x01\x26\x00\x43\x01\x43\x01\x27\x00\x28\x00\x29\x00\x2a\x00\x2b\x00\x55\x00\xcc\x01\x56\x00\xa9\x01\xb7\x00\xe8\x01\x7c\x00\xc9\x00\x97\x00\x06\x01\x7b\x00\xc0\x00\x0d\x00\x9c\xff\xce\x01\x57\x00\x9c\xff\xd0\x01\xca\x00\x58\x00\xc1\x00\x59\x00\x55\x00\x5a\x00\x56\x00\xaa\x01\xcf\x01\x5b\x00\x7c\x00\xcb\x00\xd2\x01\x7d\x00\x55\x00\xc0\x00\x56\x00\xa9\x01\xc5\x00\x57\x00\x97\x00\xa9\x01\x96\x01\x58\x00\xc1\x00\x59\x00\x0d\x00\x5a\x00\xa7\x01\x57\x00\x0d\x00\x5b\x00\xc6\x01\x58\x00\x55\x00\x59\x00\x56\x00\x5a\x00\xd4\x01\xaa\x01\xb2\x01\x5b\x00\xc7\x01\xaa\x01\xb5\x01\xc0\x00\x5c\x00\x5d\x00\x5e\x00\x57\x00\x5f\x00\xa9\x01\xaf\x01\x58\x00\xc1\x00\x59\x00\x57\x01\x5a\x00\xd6\x01\xf4\x00\x0d\x00\x5b\x00\x55\x00\xf4\x00\x56\x00\x73\x00\x0b\x00\x0c\x00\x5c\x00\x5d\x00\x5e\x00\x85\x00\x5f\x00\xaa\x01\xab\x01\xb7\x01\x0d\x00\x57\x00\x5c\x00\x5d\x00\x5e\x00\x58\x00\x5f\x00\x59\x00\x92\x01\x5a\x00\x55\x00\x93\x01\x56\x00\x5b\x00\x80\x00\x81\x00\x82\x00\x61\x00\x0c\x00\x85\x00\x9c\x00\x0c\x00\x5c\x00\x5d\x00\x5e\x00\x57\x00\x5f\x00\x0d\x00\x07\x01\x58\x00\x0d\x00\x59\x00\xd7\x01\x5a\x00\x55\x00\x63\x00\x56\x00\x5b\x00\x9d\x00\x0c\x00\x64\x00\x65\x00\x66\x00\x85\x00\x55\x00\xa8\x00\x56\x00\xa9\x00\x0d\x00\x57\x00\x5c\x00\x5d\x00\x5e\x00\x58\x00\x86\x00\x59\x00\x87\x01\x5a\x00\x93\x01\x57\x00\x38\x00\x5b\x00\x34\x01\x58\x00\xc3\x01\x59\x00\x93\x01\x5a\x00\x2d\xff\x35\x01\xd9\x01\x5b\x00\x94\x01\x12\x00\x5c\x00\x5d\x00\xa2\x00\x13\x00\xa3\x00\x14\x00\x8c\x01\x15\x00\x80\x00\x81\x00\x82\x00\x3b\x00\x0c\x00\x18\x00\x19\x00\x1a\x00\x1b\x00\x1c\x00\x71\x01\xc1\x01\x30\x00\x0d\x00\x83\x00\x31\x00\x5c\x00\x5d\x00\x5e\x00\xda\x01\xa7\x00\x62\x01\x32\x00\x33\x00\x43\x00\x0c\x00\x5c\x00\x5d\x00\x5e\x00\xf3\x00\x5f\x00\xdb\x01\xad\x01\x93\x01\x0d\x00\x34\x00\xf4\x00\x38\x00\x35\x00\x9c\x01\x27\x00\x28\x00\x29\x00\x2a\x00\x2b\x00\x12\x00\x8d\x00\x8c\x00\x8e\x00\x13\x00\x12\x00\x14\x00\x8d\x00\x15\x00\x13\x00\x0d\x00\x14\x00\x38\x00\x15\x00\x18\x00\x19\x00\x1a\x00\x1b\x00\x1c\x00\x18\x00\x19\x00\x1a\x00\x1b\x00\x1c\x00\xbd\x00\x12\x00\x74\x00\x0b\x00\x0c\x00\x13\x00\xa4\x01\x14\x00\x3e\x00\x39\x00\xde\x01\x3f\x00\x4a\x00\x0d\x00\xbd\x00\x18\x00\x19\x00\x1a\x00\x1b\x00\x1c\x00\x2c\x01\xdf\x01\x9e\x00\x81\x00\x82\x00\x27\x00\x28\x00\x29\x00\x2a\x00\x2b\x00\x27\x00\x28\x00\x29\x00\x2a\x00\x2b\x00\xbd\x00\x3e\x00\x9f\x00\xa5\x00\x3f\x00\xcd\x00\x19\x01\x38\x00\xd8\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x27\x00\x28\x00\x29\x00\x2a\x00\x2b\x00\x12\x00\x6c\x01\x9b\x00\x0d\x00\x13\x00\x9c\x00\x14\x00\xac\xff\x15\x00\x0e\x00\xd9\x00\x9e\x00\x81\x00\x82\x00\x18\x00\x19\x00\x1a\x00\x1b\x00\x1c\x00\xac\xff\xb4\x01\xac\xff\xac\xff\xac\xff\xac\xff\x8e\x01\x9f\x00\x0b\x01\x86\x01\x27\x01\xac\xff\xac\xff\xac\xff\x61\x00\x0c\x00\xac\xff\xac\xff\x88\x01\x27\x01\xac\xff\x7f\x01\xbd\x00\xa2\xff\x0d\x00\x75\x00\x0b\x00\x0c\x00\xbe\x00\x80\x01\x27\x00\x28\x00\x29\x00\x2a\x00\x2b\x00\xa2\xff\x0d\x00\xa2\xff\xa2\xff\xa2\xff\xa2\xff\x3e\x00\xb0\xff\x29\x01\x3f\x00\xe8\x00\xa2\xff\xa2\xff\xa2\xff\x8b\x01\x27\x01\xa2\xff\xa2\xff\x17\x01\xb0\xff\xa2\xff\xb0\xff\xb0\xff\xb0\xff\xb0\xff\x3e\x00\xae\xff\x1c\x01\x3f\x00\x97\x00\xb0\xff\xb0\xff\xb0\xff\x5d\x01\xf0\x00\xb0\xff\xb0\xff\xdd\x00\xae\xff\xb0\xff\xae\xff\xae\xff\xae\xff\xae\xff\x3e\x00\xaa\xff\xd0\x00\x3f\x00\x40\x00\xae\xff\xae\xff\xae\xff\x65\x01\x66\x01\xae\xff\xae\xff\x04\x00\xaa\xff\xae\xff\xaa\xff\xaa\xff\xaa\xff\xaa\xff\x3e\x00\x26\x01\x27\x01\x3f\x00\x4a\x00\xaa\xff\xaa\xff\xaa\xff\x6e\x01\x6f\x01\xaa\xff\xaa\xff\x71\x01\x72\x01\xaa\xff\x12\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x12\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x2e\x00\x0d\x00\x72\x00\x6e\x00\x6f\x00\x0b\x00\x0c\x00\x0e\x00\x0d\x00\x74\x01\x75\x01\x76\x00\x13\x01\x7e\x01\x0e\x00\x0d\x00\x05\x01\x81\x00\x82\x00\x13\x01\x14\x01\x12\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x4e\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x53\x00\x0d\x00\x6a\x00\x86\x00\x81\x00\x82\x00\xef\x01\x0e\x00\x0d\x00\x36\x01\x27\x01\xed\x01\x13\x01\x15\x01\x0e\x00\x4f\x00\x50\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x50\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xee\x01\x0d\x00\x37\x01\x38\x01\xe4\x01\x45\x00\xb3\x01\x0e\x00\x0d\x00\x9e\x00\x81\x00\x82\x00\x45\x00\x51\x00\x0e\x00\xa3\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x16\x01\xb9\x01\x9f\x00\x11\x01\xc9\x01\xef\x00\xf0\x00\xce\x01\x0d\x00\x9e\x00\x81\x00\x82\x00\x0e\x01\x82\x00\x0e\x00\xa3\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xbc\x00\xb6\x00\x9f\x00\xbb\x00\x10\x01\x82\x00\x21\x01\xf0\x00\x0d\x00\x9e\x00\x81\x00\x82\x00\x2b\x00\x2c\x00\x0e\x00\xa3\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xa4\x00\xd2\x01\x9f\x00\xa0\x00\x45\x00\xd2\x00\x45\x00\x46\x00\x0d\x00\x45\x00\x49\x00\xd4\x01\xde\x01\xe1\x01\x0e\x00\xa3\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xa9\x00\xe4\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x0d\x00\xe2\x01\xb1\x01\xb2\x01\xb9\x01\xba\x01\x0e\x00\xbc\x01\x0d\x00\xbd\x01\xbf\x01\xc3\x01\xc9\x01\xca\x01\x0e\x00\xe9\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xd5\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xcc\x01\x0d\x00\xcb\x01\x29\x01\x29\x01\xb6\x00\x8a\x01\x0e\x00\x0d\x00\x8b\x01\x29\x01\x1c\xff\x90\x01\x9a\x01\x0e\x00\xd8\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xdc\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x96\x01\x0d\x00\x9c\x01\x1c\xff\x9f\x01\xa1\x01\x1c\xff\x0e\x00\x0d\x00\xa3\x01\xa4\x01\x1c\xff\xa8\x01\xae\x01\x0e\x00\xb6\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xba\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x5d\x01\x0d\x00\xaf\x01\x5f\x01\x62\x01\x65\x01\x6a\x01\x0e\x00\x0d\x00\x64\x01\x6b\x01\x6c\x01\x6e\x01\x43\x00\x0e\x00\xbd\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xbf\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x71\x01\x0d\x00\x74\x01\x77\x01\x79\x01\x78\x01\x01\x01\x0e\x00\x0d\x00\x82\x01\x7c\x01\x43\x00\x7d\x01\x83\x01\x0e\x00\xc0\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xc4\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x84\x01\x0d\x00\x85\x01\x29\x01\x86\x01\x43\x00\x2b\x01\x0e\x00\x0d\x00\x2c\x01\x2e\x01\x2f\x01\x30\x01\x34\x01\x0e\x00\xc5\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x7d\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x31\x01\x0d\x00\x29\x01\xb7\x00\x59\x01\x5a\x01\x5b\x01\x0e\x00\x0d\x00\x5c\x01\x03\x01\x04\x01\x43\x00\x05\x01\x0e\x00\x31\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x32\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x09\x01\x0d\x00\x0a\x01\x8c\x00\x0b\x01\x0d\x01\x0e\x01\x0e\x00\x0d\x00\x1b\x01\x19\x01\x24\x01\x1c\x01\x1e\x01\x0e\x00\x0f\x01\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xcb\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x1f\x01\x0d\x00\xb8\x00\xba\x00\xb9\x00\xbb\x00\xc4\x00\x0e\x00\x0d\x00\xc2\x00\xc3\x00\xc6\x00\xc7\x00\xc8\x00\x0e\x00\xcc\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xce\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x61\x00\x0d\x00\x43\x00\xd0\x00\x43\x00\xdc\x00\xd2\x00\x0e\x00\x0d\x00\xd6\x00\xdf\x00\xe0\x00\xe2\x00\xe5\x00\x0e\x00\xd3\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xd4\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xe4\x00\x0d\x00\xe6\x00\xe7\x00\xe8\x00\x43\x00\x6c\x00\x0e\x00\x0d\x00\x61\x00\x71\x00\x7b\x00\x7f\x00\x80\x00\x0e\x00\xd7\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xda\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x89\x00\x0d\x00\x8a\x00\x88\x00\x8b\x00\x90\x00\x92\x00\x0e\x00\x0d\x00\x91\x00\x93\x00\x94\x00\x95\x00\x97\x00\x0e\x00\x6c\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x71\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x9a\x00\x0d\x00\x43\x00\x99\x00\x61\x00\xab\x00\xac\x00\x0e\x00\x0d\x00\xad\x00\xb1\x00\xae\x00\xaf\x00\xb0\x00\x0e\x00\x79\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x50\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xff\xff\x0d\x00\xff\xff\x36\x00\x3a\x00\x3d\x00\x3b\x00\x0e\x00\x0d\x00\x60\x00\x3e\x00\x43\x00\x61\x00\x69\x00\x0e\x00\x44\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\x06\x00\x07\x00\x08\x00\x09\x00\x0a\x00\x0b\x00\x0c\x00\xf6\x00\x0d\x00\xf7\x00\xf8\x00\xf9\x00\xfa\x00\x6a\x00\x0e\x00\x0d\x00\xff\xff\x06\x00\xfb\x00\xfc\x00\xfd\x00\x0e\x00\x00\x00\xfe\x00\xff\x00\x00\x00\x00\x00\x00\x01\x6d\x00\x08\x00\x6e\x00\x6f\x00\x0b\x00\x0c\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x0d\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00"# happyReduceArr = array (3, 227) [ (3 , happyReduce_3), (4 , happyReduce_4), (5 , happyReduce_5), (6 , happyReduce_6), (7 , happyReduce_7), (8 , happyReduce_8), (9 , happyReduce_9), (10 , happyReduce_10), (11 , happyReduce_11), (12 , happyReduce_12), (13 , happyReduce_13), (14 , happyReduce_14), (15 , happyReduce_15), (16 , happyReduce_16), (17 , happyReduce_17), (18 , happyReduce_18), (19 , happyReduce_19), (20 , happyReduce_20), (21 , happyReduce_21), (22 , happyReduce_22), (23 , happyReduce_23), (24 , happyReduce_24), (25 , happyReduce_25), (26 , happyReduce_26), (27 , happyReduce_27), (28 , happyReduce_28), (29 , happyReduce_29), (30 , happyReduce_30), (31 , happyReduce_31), (32 , happyReduce_32), (33 , happyReduce_33), (34 , happyReduce_34), (35 , happyReduce_35), (36 , happyReduce_36), (37 , happyReduce_37), (38 , happyReduce_38), (39 , happyReduce_39), (40 , happyReduce_40), (41 , happyReduce_41), (42 , happyReduce_42), (43 , happyReduce_43), (44 , happyReduce_44), (45 , happyReduce_45), (46 , happyReduce_46), (47 , happyReduce_47), (48 , happyReduce_48), (49 , happyReduce_49), (50 , happyReduce_50), (51 , happyReduce_51), (52 , happyReduce_52), (53 , happyReduce_53), (54 , happyReduce_54), (55 , happyReduce_55), (56 , happyReduce_56), (57 , happyReduce_57), (58 , happyReduce_58), (59 , happyReduce_59), (60 , happyReduce_60), (61 , happyReduce_61), (62 , happyReduce_62), (63 , happyReduce_63), (64 , happyReduce_64), (65 , happyReduce_65), (66 , happyReduce_66), (67 , happyReduce_67), (68 , happyReduce_68), (69 , happyReduce_69), (70 , happyReduce_70), (71 , happyReduce_71), (72 , happyReduce_72), (73 , happyReduce_73), (74 , happyReduce_74), (75 , happyReduce_75), (76 , happyReduce_76), (77 , happyReduce_77), (78 , happyReduce_78), (79 , happyReduce_79), (80 , happyReduce_80), (81 , happyReduce_81), (82 , happyReduce_82), (83 , happyReduce_83), (84 , happyReduce_84), (85 , happyReduce_85), (86 , happyReduce_86), (87 , happyReduce_87), (88 , happyReduce_88), (89 , happyReduce_89), (90 , happyReduce_90), (91 , happyReduce_91), (92 , happyReduce_92), (93 , happyReduce_93), (94 , happyReduce_94), (95 , happyReduce_95), (96 , happyReduce_96), (97 , happyReduce_97), (98 , happyReduce_98), (99 , happyReduce_99), (100 , happyReduce_100), (101 , happyReduce_101), (102 , happyReduce_102), (103 , happyReduce_103), (104 , happyReduce_104), (105 , happyReduce_105), (106 , happyReduce_106), (107 , happyReduce_107), (108 , happyReduce_108), (109 , happyReduce_109), (110 , happyReduce_110), (111 , happyReduce_111), (112 , happyReduce_112), (113 , happyReduce_113), (114 , happyReduce_114), (115 , happyReduce_115), (116 , happyReduce_116), (117 , happyReduce_117), (118 , happyReduce_118), (119 , happyReduce_119), (120 , happyReduce_120), (121 , happyReduce_121), (122 , happyReduce_122), (123 , happyReduce_123), (124 , happyReduce_124), (125 , happyReduce_125), (126 , happyReduce_126), (127 , happyReduce_127), (128 , happyReduce_128), (129 , happyReduce_129), (130 , happyReduce_130), (131 , happyReduce_131), (132 , happyReduce_132), (133 , happyReduce_133), (134 , happyReduce_134), (135 , happyReduce_135), (136 , happyReduce_136), (137 , happyReduce_137), (138 , happyReduce_138), (139 , happyReduce_139), (140 , happyReduce_140), (141 , happyReduce_141), (142 , happyReduce_142), (143 , happyReduce_143), (144 , happyReduce_144), (145 , happyReduce_145), (146 , happyReduce_146), (147 , happyReduce_147), (148 , happyReduce_148), (149 , happyReduce_149), (150 , happyReduce_150), (151 , happyReduce_151), (152 , happyReduce_152), (153 , happyReduce_153), (154 , happyReduce_154), (155 , happyReduce_155), (156 , happyReduce_156), (157 , happyReduce_157), (158 , happyReduce_158), (159 , happyReduce_159), (160 , happyReduce_160), (161 , happyReduce_161), (162 , happyReduce_162), (163 , happyReduce_163), (164 , happyReduce_164), (165 , happyReduce_165), (166 , happyReduce_166), (167 , happyReduce_167), (168 , happyReduce_168), (169 , happyReduce_169), (170 , happyReduce_170), (171 , happyReduce_171), (172 , happyReduce_172), (173 , happyReduce_173), (174 , happyReduce_174), (175 , happyReduce_175), (176 , happyReduce_176), (177 , happyReduce_177), (178 , happyReduce_178), (179 , happyReduce_179), (180 , happyReduce_180), (181 , happyReduce_181), (182 , happyReduce_182), (183 , happyReduce_183), (184 , happyReduce_184), (185 , happyReduce_185), (186 , happyReduce_186), (187 , happyReduce_187), (188 , happyReduce_188), (189 , happyReduce_189), (190 , happyReduce_190), (191 , happyReduce_191), (192 , happyReduce_192), (193 , happyReduce_193), (194 , happyReduce_194), (195 , happyReduce_195), (196 , happyReduce_196), (197 , happyReduce_197), (198 , happyReduce_198), (199 , happyReduce_199), (200 , happyReduce_200), (201 , happyReduce_201), (202 , happyReduce_202), (203 , happyReduce_203), (204 , happyReduce_204), (205 , happyReduce_205), (206 , happyReduce_206), (207 , happyReduce_207), (208 , happyReduce_208), (209 , happyReduce_209), (210 , happyReduce_210), (211 , happyReduce_211), (212 , happyReduce_212), (213 , happyReduce_213), (214 , happyReduce_214), (215 , happyReduce_215), (216 , happyReduce_216), (217 , happyReduce_217), (218 , happyReduce_218), (219 , happyReduce_219), (220 , happyReduce_220), (221 , happyReduce_221), (222 , happyReduce_222), (223 , happyReduce_223), (224 , happyReduce_224), (225 , happyReduce_225), (226 , happyReduce_226), (227 , happyReduce_227) ] happy_n_terms = 72 :: Int happy_n_nonterms = 73 :: Int happyReduce_3 = happyMonadReduce 4# 0# happyReduction_3 happyReduction_3 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOut8 happy_x_1 of { happy_var_1 -> case happyOut9 happy_x_2 of { happy_var_2 -> case happyOut12 happy_x_4 of { happy_var_4 -> ( do let mstat = happy_var_1 (mtype,id) = happy_var_2 (extends,with,content) = happy_var_4 (opens,jments,opts) = case content of { Just c -> c; Nothing -> ([],[],noOptions) } mapM_ (checkInfoType mtype) jments defs <- case buildAnyTree id [(i,d) | (i,_,d) <- jments] of Ok x -> return x Bad msg -> fail msg let poss = buildTree [(i,(fname,mkSrcSpan p)) | (i,p,_) <- jments] fname = prIdent id ++ ".gf" mkSrcSpan :: (Posn, Posn) -> (Int,Int) mkSrcSpan (Pn l1 _, Pn l2 _) = (l1,l2) return (id, ModInfo mtype mstat opts extends with opens [] defs poss))}}} ) (\r -> happyReturn (happyIn6 r)) happyReduce_4 = happyReduce 4# 1# happyReduction_4 happyReduction_4 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut8 happy_x_1 of { happy_var_1 -> case happyOut9 happy_x_2 of { happy_var_2 -> case happyOut10 happy_x_4 of { happy_var_4 -> happyIn7 (let { mstat = happy_var_1 ; (mtype,id) = happy_var_2 ; (extends,with,opens) = happy_var_4 } in (id, ModInfo mtype mstat noOptions extends with opens [] emptyBinTree emptyBinTree) ) `HappyStk` happyRest}}} happyReduce_5 = happySpecReduce_0 2# happyReduction_5 happyReduction_5 = happyIn8 (MSComplete ) happyReduce_6 = happySpecReduce_1 2# happyReduction_6 happyReduction_6 happy_x_1 = happyIn8 (MSIncomplete ) happyReduce_7 = happySpecReduce_2 3# happyReduction_7 happyReduction_7 happy_x_2 happy_x_1 = case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> happyIn9 ((MTAbstract, happy_var_2) )} happyReduce_8 = happySpecReduce_2 3# happyReduction_8 happyReduction_8 happy_x_2 happy_x_1 = case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> happyIn9 ((MTResource, happy_var_2) )} happyReduce_9 = happySpecReduce_2 3# happyReduction_9 happyReduction_9 happy_x_2 happy_x_1 = case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> happyIn9 ((MTInterface, happy_var_2) )} happyReduce_10 = happyReduce 4# 3# happyReduction_10 happyReduction_10 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> case happyOutTok happy_x_4 of { ((T_Ident happy_var_4)) -> happyIn9 ((MTConcrete happy_var_4, happy_var_2) ) `HappyStk` happyRest}} happyReduce_11 = happyReduce 4# 3# happyReduction_11 happyReduction_11 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> case happyOutTok happy_x_4 of { ((T_Ident happy_var_4)) -> happyIn9 ((MTInstance happy_var_4, happy_var_2) ) `HappyStk` happyRest}} happyReduce_12 = happyReduce 6# 3# happyReduction_12 happyReduction_12 (happy_x_6 `HappyStk` happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> case happyOut16 happy_x_4 of { happy_var_4 -> case happyOut16 happy_x_6 of { happy_var_6 -> happyIn9 ((MTTransfer happy_var_4 happy_var_6,happy_var_2) ) `HappyStk` happyRest}}} happyReduce_13 = happyReduce 7# 4# happyReduction_13 happyReduction_13 (happy_x_7 `HappyStk` happy_x_6 `HappyStk` happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut19 happy_x_1 of { happy_var_1 -> case happyOut20 happy_x_3 of { happy_var_3 -> case happyOut17 happy_x_5 of { happy_var_5 -> case happyOut11 happy_x_7 of { happy_var_7 -> happyIn10 ((happy_var_1, Just (fst happy_var_3,snd happy_var_3,happy_var_5), happy_var_7) ) `HappyStk` happyRest}}}} happyReduce_14 = happyReduce 5# 4# happyReduction_14 happyReduction_14 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut19 happy_x_1 of { happy_var_1 -> case happyOut20 happy_x_3 of { happy_var_3 -> case happyOut17 happy_x_5 of { happy_var_5 -> happyIn10 ((happy_var_1, Just (fst happy_var_3,snd happy_var_3,happy_var_5), []) ) `HappyStk` happyRest}}} happyReduce_15 = happySpecReduce_3 4# happyReduction_15 happyReduction_15 happy_x_3 happy_x_2 happy_x_1 = case happyOut19 happy_x_1 of { happy_var_1 -> case happyOut11 happy_x_3 of { happy_var_3 -> happyIn10 ((happy_var_1, Nothing, happy_var_3) )}} happyReduce_16 = happySpecReduce_1 4# happyReduction_16 happyReduction_16 happy_x_1 = case happyOut19 happy_x_1 of { happy_var_1 -> happyIn10 ((happy_var_1, Nothing, []) )} happyReduce_17 = happyReduce 5# 4# happyReduction_17 happyReduction_17 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut20 happy_x_1 of { happy_var_1 -> case happyOut17 happy_x_3 of { happy_var_3 -> case happyOut11 happy_x_5 of { happy_var_5 -> happyIn10 (([], Just (fst happy_var_1,snd happy_var_1,happy_var_3), happy_var_5) ) `HappyStk` happyRest}}} happyReduce_18 = happySpecReduce_3 4# happyReduction_18 happyReduction_18 happy_x_3 happy_x_2 happy_x_1 = case happyOut20 happy_x_1 of { happy_var_1 -> case happyOut17 happy_x_3 of { happy_var_3 -> happyIn10 (([], Just (fst happy_var_1,snd happy_var_1,happy_var_3), []) )}} happyReduce_19 = happySpecReduce_1 4# happyReduction_19 happyReduction_19 happy_x_1 = case happyOut11 happy_x_1 of { happy_var_1 -> happyIn10 (([], Nothing, happy_var_1) )} happyReduce_20 = happySpecReduce_0 5# happyReduction_20 happyReduction_20 = happyIn11 ([] ) happyReduce_21 = happySpecReduce_2 5# happyReduction_21 happyReduction_21 happy_x_2 happy_x_1 = case happyOut15 happy_x_2 of { happy_var_2 -> happyIn11 (happy_var_2 )} happyReduce_22 = happyReduce 7# 6# happyReduction_22 happyReduction_22 (happy_x_7 `HappyStk` happy_x_6 `HappyStk` happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut19 happy_x_1 of { happy_var_1 -> case happyOut20 happy_x_3 of { happy_var_3 -> case happyOut17 happy_x_5 of { happy_var_5 -> case happyOut13 happy_x_7 of { happy_var_7 -> happyIn12 ((happy_var_1, Just (fst happy_var_3,snd happy_var_3,happy_var_5), Just happy_var_7) ) `HappyStk` happyRest}}}} happyReduce_23 = happyReduce 5# 6# happyReduction_23 happyReduction_23 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut19 happy_x_1 of { happy_var_1 -> case happyOut20 happy_x_3 of { happy_var_3 -> case happyOut17 happy_x_5 of { happy_var_5 -> happyIn12 ((happy_var_1, Just (fst happy_var_3,snd happy_var_3,happy_var_5), Nothing) ) `HappyStk` happyRest}}} happyReduce_24 = happySpecReduce_3 6# happyReduction_24 happyReduction_24 happy_x_3 happy_x_2 happy_x_1 = case happyOut19 happy_x_1 of { happy_var_1 -> case happyOut13 happy_x_3 of { happy_var_3 -> happyIn12 ((happy_var_1, Nothing, Just happy_var_3) )}} happyReduce_25 = happySpecReduce_1 6# happyReduction_25 happyReduction_25 happy_x_1 = case happyOut19 happy_x_1 of { happy_var_1 -> happyIn12 ((happy_var_1, Nothing, Nothing) )} happyReduce_26 = happyReduce 5# 6# happyReduction_26 happyReduction_26 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut20 happy_x_1 of { happy_var_1 -> case happyOut17 happy_x_3 of { happy_var_3 -> case happyOut13 happy_x_5 of { happy_var_5 -> happyIn12 (([], Just (fst happy_var_1,snd happy_var_1,happy_var_3), Just happy_var_5) ) `HappyStk` happyRest}}} happyReduce_27 = happySpecReduce_3 6# happyReduction_27 happyReduction_27 happy_x_3 happy_x_2 happy_x_1 = case happyOut20 happy_x_1 of { happy_var_1 -> case happyOut17 happy_x_3 of { happy_var_3 -> happyIn12 (([], Just (fst happy_var_1,snd happy_var_1,happy_var_3), Nothing) )}} happyReduce_28 = happySpecReduce_1 6# happyReduction_28 happyReduction_28 happy_x_1 = case happyOut13 happy_x_1 of { happy_var_1 -> happyIn12 (([], Nothing, Just happy_var_1) )} happyReduce_29 = happySpecReduce_2 6# happyReduction_29 happyReduction_29 happy_x_2 happy_x_1 = case happyOut12 happy_x_1 of { happy_var_1 -> happyIn12 (happy_var_1 )} happyReduce_30 = happySpecReduce_3 7# happyReduction_30 happyReduction_30 happy_x_3 happy_x_2 happy_x_1 = case happyOut14 happy_x_2 of { happy_var_2 -> happyIn13 (([],[d | Left ds <- happy_var_2, d <- ds],concatOptions [o | Right o <- happy_var_2]) )} happyReduce_31 = happyReduce 6# 7# happyReduction_31 happyReduction_31 (happy_x_6 `HappyStk` happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut15 happy_x_2 of { happy_var_2 -> case happyOut14 happy_x_5 of { happy_var_5 -> happyIn13 ((happy_var_2,[d | Left ds <- happy_var_5, d <- ds],concatOptions [o | Right o <- happy_var_5]) ) `HappyStk` happyRest}} happyReduce_32 = happySpecReduce_0 8# happyReduction_32 happyReduction_32 = happyIn14 ([] ) happyReduce_33 = happySpecReduce_2 8# happyReduction_33 happyReduction_33 happy_x_2 happy_x_1 = case happyOut21 happy_x_1 of { happy_var_1 -> case happyOut14 happy_x_2 of { happy_var_2 -> happyIn14 (happy_var_1 : happy_var_2 )}} happyReduce_34 = happySpecReduce_1 9# happyReduction_34 happyReduction_34 happy_x_1 = case happyOut16 happy_x_1 of { happy_var_1 -> happyIn15 ([happy_var_1] )} happyReduce_35 = happySpecReduce_3 9# happyReduction_35 happyReduction_35 happy_x_3 happy_x_2 happy_x_1 = case happyOut16 happy_x_1 of { happy_var_1 -> case happyOut15 happy_x_3 of { happy_var_3 -> happyIn15 (happy_var_1 : happy_var_3 )}} happyReduce_36 = happySpecReduce_1 10# happyReduction_36 happyReduction_36 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> happyIn16 (OSimple happy_var_1 )} happyReduce_37 = happyReduce 5# 10# happyReduction_37 happyReduction_37 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> case happyOutTok happy_x_4 of { ((T_Ident happy_var_4)) -> happyIn16 (OQualif happy_var_2 happy_var_4 ) `HappyStk` happyRest}} happyReduce_38 = happySpecReduce_1 11# happyReduction_38 happyReduction_38 happy_x_1 = case happyOut18 happy_x_1 of { happy_var_1 -> happyIn17 ([happy_var_1] )} happyReduce_39 = happySpecReduce_3 11# happyReduction_39 happyReduction_39 happy_x_3 happy_x_2 happy_x_1 = case happyOut18 happy_x_1 of { happy_var_1 -> case happyOut17 happy_x_3 of { happy_var_3 -> happyIn17 (happy_var_1 : happy_var_3 )}} happyReduce_40 = happyReduce 5# 12# happyReduction_40 happyReduction_40 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> case happyOutTok happy_x_4 of { ((T_Ident happy_var_4)) -> happyIn18 ((happy_var_2,happy_var_4) ) `HappyStk` happyRest}} happyReduce_41 = happySpecReduce_1 13# happyReduction_41 happyReduction_41 happy_x_1 = case happyOut20 happy_x_1 of { happy_var_1 -> happyIn19 ([happy_var_1] )} happyReduce_42 = happySpecReduce_3 13# happyReduction_42 happyReduction_42 happy_x_3 happy_x_2 happy_x_1 = case happyOut20 happy_x_1 of { happy_var_1 -> case happyOut19 happy_x_3 of { happy_var_3 -> happyIn19 (happy_var_1 : happy_var_3 )}} happyReduce_43 = happySpecReduce_1 14# happyReduction_43 happyReduction_43 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> happyIn20 ((happy_var_1,MIAll ) )} happyReduce_44 = happyReduce 4# 14# happyReduction_44 happyReduction_44 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> case happyOut43 happy_x_3 of { happy_var_3 -> happyIn20 ((happy_var_1,MIOnly happy_var_3) ) `HappyStk` happyRest}} happyReduce_45 = happyReduce 5# 14# happyReduction_45 happyReduction_45 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> case happyOut43 happy_x_4 of { happy_var_4 -> happyIn20 ((happy_var_1,MIExcept happy_var_4) ) `HappyStk` happyRest}} happyReduce_46 = happySpecReduce_2 15# happyReduction_46 happyReduction_46 happy_x_2 happy_x_1 = case happyOut36 happy_x_2 of { happy_var_2 -> happyIn21 (Left happy_var_2 )} happyReduce_47 = happySpecReduce_2 15# happyReduction_47 happyReduction_47 happy_x_2 happy_x_1 = case happyOut37 happy_x_2 of { happy_var_2 -> happyIn21 (Left happy_var_2 )} happyReduce_48 = happySpecReduce_2 15# happyReduction_48 happyReduction_48 happy_x_2 happy_x_1 = case happyOut34 happy_x_2 of { happy_var_2 -> happyIn21 (Left happy_var_2 )} happyReduce_49 = happySpecReduce_2 15# happyReduction_49 happyReduction_49 happy_x_2 happy_x_1 = case happyOut38 happy_x_2 of { happy_var_2 -> happyIn21 (Left happy_var_2 )} happyReduce_50 = happySpecReduce_2 15# happyReduction_50 happyReduction_50 happy_x_2 happy_x_1 = case happyOut39 happy_x_2 of { happy_var_2 -> happyIn21 (Left happy_var_2 )} happyReduce_51 = happySpecReduce_2 15# happyReduction_51 happyReduction_51 happy_x_2 happy_x_1 = case happyOut35 happy_x_2 of { happy_var_2 -> happyIn21 (Left happy_var_2 )} happyReduce_52 = happySpecReduce_2 15# happyReduction_52 happyReduction_52 happy_x_2 happy_x_1 = case happyOut40 happy_x_2 of { happy_var_2 -> happyIn21 (Left [(f, pos, CncCat (Just e) Nothing Nothing ) | (f,pos,e) <- happy_var_2] )} happyReduce_53 = happySpecReduce_2 15# happyReduction_53 happyReduction_53 happy_x_2 happy_x_1 = case happyOut40 happy_x_2 of { happy_var_2 -> happyIn21 (Left [(f, pos, CncCat Nothing (Just e) Nothing ) | (f,pos,e) <- happy_var_2] )} happyReduce_54 = happySpecReduce_2 15# happyReduction_54 happyReduction_54 happy_x_2 happy_x_1 = case happyOut33 happy_x_2 of { happy_var_2 -> happyIn21 (Left happy_var_2 )} happyReduce_55 = happySpecReduce_3 15# happyReduction_55 happyReduction_55 happy_x_3 happy_x_2 happy_x_1 = case happyOut40 happy_x_3 of { happy_var_3 -> happyIn21 (Left [(f, pos, CncCat Nothing Nothing (Just e)) | (f,pos,e) <- happy_var_3] )} happyReduce_56 = happySpecReduce_3 15# happyReduction_56 happyReduction_56 happy_x_3 happy_x_2 happy_x_1 = case happyOut40 happy_x_3 of { happy_var_3 -> happyIn21 (Left [(f, pos, CncFun Nothing Nothing (Just e)) | (f,pos,e) <- happy_var_3] )} happyReduce_57 = happySpecReduce_2 15# happyReduction_57 happyReduction_57 happy_x_2 happy_x_1 = case happyOut41 happy_x_2 of { happy_var_2 -> happyIn21 (Right happy_var_2 )} happyReduce_58 = happyReduce 4# 16# happyReduction_58 happyReduction_58 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> case happyOut77 happy_x_3 of { happy_var_3 -> case happyOut78 happy_x_4 of { happy_var_4 -> happyIn22 ([(happy_var_2, (happy_var_1,happy_var_4), AbsCat (Just happy_var_3) Nothing)] ) `HappyStk` happyRest}}}} happyReduce_59 = happyReduce 6# 16# happyReduction_59 happyReduction_59 (happy_x_6 `HappyStk` happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOutTok happy_x_3 of { ((T_Ident happy_var_3)) -> case happyOut77 happy_x_4 of { happy_var_4 -> case happyOut78 happy_x_6 of { happy_var_6 -> happyIn22 (listCatDef happy_var_3 (happy_var_1,happy_var_6) happy_var_4 0 ) `HappyStk` happyRest}}}} happyReduce_60 = happyReduce 9# 16# happyReduction_60 happyReduction_60 (happy_x_9 `HappyStk` happy_x_8 `HappyStk` happy_x_7 `HappyStk` happy_x_6 `HappyStk` happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOutTok happy_x_3 of { ((T_Ident happy_var_3)) -> case happyOut77 happy_x_4 of { happy_var_4 -> case happyOutTok happy_x_7 of { ((T_Integer happy_var_7)) -> case happyOut78 happy_x_9 of { happy_var_9 -> happyIn22 (listCatDef happy_var_3 (happy_var_1,happy_var_9) happy_var_4 (fromIntegral happy_var_7) ) `HappyStk` happyRest}}}}} happyReduce_61 = happyReduce 5# 17# happyReduction_61 happyReduction_61 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOut43 happy_x_2 of { happy_var_2 -> case happyOut48 happy_x_4 of { happy_var_4 -> case happyOut78 happy_x_5 of { happy_var_5 -> happyIn23 ([(fun, (happy_var_1,happy_var_5), AbsFun (Just happy_var_4) Nothing (Just [])) | fun <- happy_var_2] ) `HappyStk` happyRest}}}} happyReduce_62 = happyReduce 5# 18# happyReduction_62 happyReduction_62 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOut45 happy_x_2 of { happy_var_2 -> case happyOut48 happy_x_4 of { happy_var_4 -> case happyOut78 happy_x_5 of { happy_var_5 -> happyIn24 ([(f, (happy_var_1,happy_var_5),AbsFun Nothing (Just 0) (Just [([],happy_var_4)])) | f <- happy_var_2] ) `HappyStk` happyRest}}}} happyReduce_63 = happyReduce 6# 18# happyReduction_63 happyReduction_63 (happy_x_6 `HappyStk` happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOut44 happy_x_2 of { happy_var_2 -> case happyOut65 happy_x_3 of { happy_var_3 -> case happyOut48 happy_x_5 of { happy_var_5 -> case happyOut78 happy_x_6 of { happy_var_6 -> happyIn24 ([(happy_var_2,(happy_var_1,happy_var_6),AbsFun Nothing (Just (length happy_var_3)) (Just [(happy_var_3,happy_var_5)]))] ) `HappyStk` happyRest}}}}} happyReduce_64 = happyReduce 5# 19# happyReduction_64 happyReduction_64 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> case happyOut31 happy_x_4 of { happy_var_4 -> case happyOut78 happy_x_5 of { happy_var_5 -> happyIn25 ((happy_var_2, (happy_var_1,happy_var_5), AbsCat Nothing (Just (map Cn happy_var_4))) : [(fun, (happy_var_1,happy_var_5), AbsFun Nothing Nothing Nothing) | fun <- happy_var_4] ) `HappyStk` happyRest}}}} happyReduce_65 = happyReduce 5# 19# happyReduction_65 happyReduction_65 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOut43 happy_x_2 of { happy_var_2 -> case happyOut48 happy_x_4 of { happy_var_4 -> case happyOut78 happy_x_5 of { happy_var_5 -> happyIn25 ([(cat, (happy_var_1,happy_var_5), AbsCat Nothing (Just (map Cn happy_var_2))) | Ok (_,cat) <- [valCat happy_var_4]] ++ [(fun, (happy_var_1,happy_var_5), AbsFun (Just happy_var_4) Nothing Nothing) | fun <- happy_var_2] ) `HappyStk` happyRest}}}} happyReduce_66 = happyReduce 5# 20# happyReduction_66 happyReduction_66 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> case happyOut42 happy_x_4 of { happy_var_4 -> case happyOut78 happy_x_5 of { happy_var_5 -> happyIn26 ((happy_var_2, (happy_var_1,happy_var_5), ResParam (Just (happy_var_4,Nothing))) : [(f, (happy_var_1,happy_var_5), ResValue (Just (mkProdSimple co (Cn happy_var_2),Nothing))) | (f,co) <- happy_var_4] ) `HappyStk` happyRest}}}} happyReduce_67 = happySpecReduce_3 20# happyReduction_67 happyReduction_67 happy_x_3 happy_x_2 happy_x_1 = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> case happyOut78 happy_x_3 of { happy_var_3 -> happyIn26 ([(happy_var_2, (happy_var_1,happy_var_3), ResParam Nothing)] )}}} happyReduce_68 = happyReduce 5# 21# happyReduction_68 happyReduction_68 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOut45 happy_x_2 of { happy_var_2 -> case happyOut48 happy_x_4 of { happy_var_4 -> case happyOut78 happy_x_5 of { happy_var_5 -> happyIn27 ([(i, (happy_var_1,happy_var_5), info) | i <- happy_var_2, info <- mkOverload (Just happy_var_4) Nothing ] ) `HappyStk` happyRest}}}} happyReduce_69 = happyReduce 5# 21# happyReduction_69 happyReduction_69 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOut45 happy_x_2 of { happy_var_2 -> case happyOut48 happy_x_4 of { happy_var_4 -> case happyOut78 happy_x_5 of { happy_var_5 -> happyIn27 ([(i, (happy_var_1,happy_var_5), info) | i <- happy_var_2, info <- mkOverload Nothing (Just happy_var_4)] ) `HappyStk` happyRest}}}} happyReduce_70 = happyReduce 6# 21# happyReduction_70 happyReduction_70 (happy_x_6 `HappyStk` happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOut44 happy_x_2 of { happy_var_2 -> case happyOut66 happy_x_3 of { happy_var_3 -> case happyOut48 happy_x_5 of { happy_var_5 -> case happyOut78 happy_x_6 of { happy_var_6 -> happyIn27 ([(i, (happy_var_1,happy_var_6), info) | i <- [happy_var_2], info <- mkOverload Nothing (Just (mkAbs happy_var_3 happy_var_5))] ) `HappyStk` happyRest}}}}} happyReduce_71 = happyReduce 7# 21# happyReduction_71 happyReduction_71 (happy_x_7 `HappyStk` happy_x_6 `HappyStk` happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOut45 happy_x_2 of { happy_var_2 -> case happyOut48 happy_x_4 of { happy_var_4 -> case happyOut48 happy_x_6 of { happy_var_6 -> case happyOut78 happy_x_7 of { happy_var_7 -> happyIn27 ([(i, (happy_var_1,happy_var_7), info) | i <- happy_var_2, info <- mkOverload (Just happy_var_4) (Just happy_var_6)] ) `HappyStk` happyRest}}}}} happyReduce_72 = happyReduce 5# 22# happyReduction_72 happyReduction_72 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOut45 happy_x_2 of { happy_var_2 -> case happyOut48 happy_x_4 of { happy_var_4 -> case happyOut78 happy_x_5 of { happy_var_5 -> happyIn28 ([(f, (happy_var_1,happy_var_5), CncFun Nothing (Just happy_var_4) Nothing) | f <- happy_var_2] ) `HappyStk` happyRest}}}} happyReduce_73 = happyReduce 6# 22# happyReduction_73 happyReduction_73 (happy_x_6 `HappyStk` happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOut44 happy_x_2 of { happy_var_2 -> case happyOut66 happy_x_3 of { happy_var_3 -> case happyOut48 happy_x_5 of { happy_var_5 -> case happyOut78 happy_x_6 of { happy_var_6 -> happyIn28 ([(happy_var_2, (happy_var_1,happy_var_6), CncFun Nothing (Just (mkAbs happy_var_3 happy_var_5)) Nothing)] ) `HappyStk` happyRest}}}}} happyReduce_74 = happyReduce 5# 23# happyReduction_74 happyReduction_74 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut78 happy_x_1 of { happy_var_1 -> case happyOut45 happy_x_2 of { happy_var_2 -> case happyOut48 happy_x_4 of { happy_var_4 -> case happyOut78 happy_x_5 of { happy_var_5 -> happyIn29 ([(i,(happy_var_1,happy_var_5),happy_var_4) | i <- happy_var_2] ) `HappyStk` happyRest}}}} happyReduce_75 = happyMonadReduce 5# 24# happyReduction_75 happyReduction_75 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOut78 happy_x_1 of { happy_var_1 -> case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> case happyOutTok happy_x_4 of { ((T_Ident happy_var_4)) -> ( case parseModuleOptions ["--" ++ prIdent happy_var_2 ++ "=" ++ prIdent happy_var_4] of Ok x -> return x Bad msg -> failLoc happy_var_1 msg)}}} ) (\r -> happyReturn (happyIn30 r)) happyReduce_76 = happySpecReduce_1 25# happyReduction_76 happyReduction_76 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> happyIn31 ([happy_var_1] )} happyReduce_77 = happySpecReduce_3 25# happyReduction_77 happyReduction_77 happy_x_3 happy_x_2 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> case happyOut31 happy_x_3 of { happy_var_3 -> happyIn31 (happy_var_1 : happy_var_3 )}} happyReduce_78 = happySpecReduce_2 26# happyReduction_78 happyReduction_78 happy_x_2 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> case happyOut77 happy_x_2 of { happy_var_2 -> happyIn32 ((happy_var_1,happy_var_2) )}} happyReduce_79 = happySpecReduce_2 27# happyReduction_79 happyReduction_79 happy_x_2 happy_x_1 = case happyOut28 happy_x_1 of { happy_var_1 -> happyIn33 (happy_var_1 )} happyReduce_80 = happySpecReduce_3 27# happyReduction_80 happyReduction_80 happy_x_3 happy_x_2 happy_x_1 = case happyOut28 happy_x_1 of { happy_var_1 -> case happyOut33 happy_x_3 of { happy_var_3 -> happyIn33 (happy_var_1 ++ happy_var_3 )}} happyReduce_81 = happySpecReduce_2 28# happyReduction_81 happyReduction_81 happy_x_2 happy_x_1 = case happyOut24 happy_x_1 of { happy_var_1 -> happyIn34 (happy_var_1 )} happyReduce_82 = happySpecReduce_3 28# happyReduction_82 happyReduction_82 happy_x_3 happy_x_2 happy_x_1 = case happyOut24 happy_x_1 of { happy_var_1 -> case happyOut34 happy_x_3 of { happy_var_3 -> happyIn34 (happy_var_1 ++ happy_var_3 )}} happyReduce_83 = happySpecReduce_2 29# happyReduction_83 happyReduction_83 happy_x_2 happy_x_1 = case happyOut27 happy_x_1 of { happy_var_1 -> happyIn35 (happy_var_1 )} happyReduce_84 = happySpecReduce_3 29# happyReduction_84 happyReduction_84 happy_x_3 happy_x_2 happy_x_1 = case happyOut27 happy_x_1 of { happy_var_1 -> case happyOut35 happy_x_3 of { happy_var_3 -> happyIn35 (happy_var_1 ++ happy_var_3 )}} happyReduce_85 = happySpecReduce_2 30# happyReduction_85 happyReduction_85 happy_x_2 happy_x_1 = case happyOut22 happy_x_1 of { happy_var_1 -> happyIn36 (happy_var_1 )} happyReduce_86 = happySpecReduce_3 30# happyReduction_86 happyReduction_86 happy_x_3 happy_x_2 happy_x_1 = case happyOut22 happy_x_1 of { happy_var_1 -> case happyOut36 happy_x_3 of { happy_var_3 -> happyIn36 (happy_var_1 ++ happy_var_3 )}} happyReduce_87 = happySpecReduce_2 31# happyReduction_87 happyReduction_87 happy_x_2 happy_x_1 = case happyOut23 happy_x_1 of { happy_var_1 -> happyIn37 (happy_var_1 )} happyReduce_88 = happySpecReduce_3 31# happyReduction_88 happyReduction_88 happy_x_3 happy_x_2 happy_x_1 = case happyOut23 happy_x_1 of { happy_var_1 -> case happyOut37 happy_x_3 of { happy_var_3 -> happyIn37 (happy_var_1 ++ happy_var_3 )}} happyReduce_89 = happySpecReduce_2 32# happyReduction_89 happyReduction_89 happy_x_2 happy_x_1 = case happyOut25 happy_x_1 of { happy_var_1 -> happyIn38 (happy_var_1 )} happyReduce_90 = happySpecReduce_3 32# happyReduction_90 happyReduction_90 happy_x_3 happy_x_2 happy_x_1 = case happyOut25 happy_x_1 of { happy_var_1 -> case happyOut38 happy_x_3 of { happy_var_3 -> happyIn38 (happy_var_1 ++ happy_var_3 )}} happyReduce_91 = happySpecReduce_2 33# happyReduction_91 happyReduction_91 happy_x_2 happy_x_1 = case happyOut26 happy_x_1 of { happy_var_1 -> happyIn39 (happy_var_1 )} happyReduce_92 = happySpecReduce_3 33# happyReduction_92 happyReduction_92 happy_x_3 happy_x_2 happy_x_1 = case happyOut26 happy_x_1 of { happy_var_1 -> case happyOut39 happy_x_3 of { happy_var_3 -> happyIn39 (happy_var_1 ++ happy_var_3 )}} happyReduce_93 = happySpecReduce_2 34# happyReduction_93 happyReduction_93 happy_x_2 happy_x_1 = case happyOut29 happy_x_1 of { happy_var_1 -> happyIn40 (happy_var_1 )} happyReduce_94 = happySpecReduce_3 34# happyReduction_94 happyReduction_94 happy_x_3 happy_x_2 happy_x_1 = case happyOut29 happy_x_1 of { happy_var_1 -> case happyOut40 happy_x_3 of { happy_var_3 -> happyIn40 (happy_var_1 ++ happy_var_3 )}} happyReduce_95 = happySpecReduce_2 35# happyReduction_95 happyReduction_95 happy_x_2 happy_x_1 = case happyOut30 happy_x_1 of { happy_var_1 -> happyIn41 (happy_var_1 )} happyReduce_96 = happySpecReduce_3 35# happyReduction_96 happyReduction_96 happy_x_3 happy_x_2 happy_x_1 = case happyOut30 happy_x_1 of { happy_var_1 -> case happyOut41 happy_x_3 of { happy_var_3 -> happyIn41 (addOptions happy_var_1 happy_var_3 )}} happyReduce_97 = happySpecReduce_1 36# happyReduction_97 happyReduction_97 happy_x_1 = case happyOut32 happy_x_1 of { happy_var_1 -> happyIn42 ([happy_var_1] )} happyReduce_98 = happySpecReduce_3 36# happyReduction_98 happyReduction_98 happy_x_3 happy_x_2 happy_x_1 = case happyOut32 happy_x_1 of { happy_var_1 -> case happyOut42 happy_x_3 of { happy_var_3 -> happyIn42 (happy_var_1 : happy_var_3 )}} happyReduce_99 = happySpecReduce_1 37# happyReduction_99 happyReduction_99 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> happyIn43 ([happy_var_1] )} happyReduce_100 = happySpecReduce_3 37# happyReduction_100 happyReduction_100 happy_x_3 happy_x_2 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> case happyOut43 happy_x_3 of { happy_var_3 -> happyIn43 (happy_var_1 : happy_var_3 )}} happyReduce_101 = happySpecReduce_1 38# happyReduction_101 happyReduction_101 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> happyIn44 (happy_var_1 )} happyReduce_102 = happySpecReduce_3 38# happyReduction_102 happyReduction_102 happy_x_3 happy_x_2 happy_x_1 = case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> happyIn44 (mkListId happy_var_2 )} happyReduce_103 = happySpecReduce_1 39# happyReduction_103 happyReduction_103 happy_x_1 = case happyOut44 happy_x_1 of { happy_var_1 -> happyIn45 ([happy_var_1] )} happyReduce_104 = happySpecReduce_3 39# happyReduction_104 happyReduction_104 happy_x_3 happy_x_2 happy_x_1 = case happyOut44 happy_x_1 of { happy_var_1 -> case happyOut45 happy_x_3 of { happy_var_3 -> happyIn45 (happy_var_1 : happy_var_3 )}} happyReduce_105 = happySpecReduce_3 40# happyReduction_105 happyReduction_105 happy_x_3 happy_x_2 happy_x_1 = case happyOut43 happy_x_1 of { happy_var_1 -> case happyOut48 happy_x_3 of { happy_var_3 -> happyIn46 ([(lab,Just happy_var_3,Nothing) | lab <- happy_var_1] )}} happyReduce_106 = happySpecReduce_3 40# happyReduction_106 happyReduction_106 happy_x_3 happy_x_2 happy_x_1 = case happyOut43 happy_x_1 of { happy_var_1 -> case happyOut48 happy_x_3 of { happy_var_3 -> happyIn46 ([(lab,Nothing,Just happy_var_3) | lab <- happy_var_1] )}} happyReduce_107 = happyReduce 5# 40# happyReduction_107 happyReduction_107 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut43 happy_x_1 of { happy_var_1 -> case happyOut48 happy_x_3 of { happy_var_3 -> case happyOut48 happy_x_5 of { happy_var_5 -> happyIn46 ([(lab,Just happy_var_3,Just happy_var_5) | lab <- happy_var_1] ) `HappyStk` happyRest}}} happyReduce_108 = happySpecReduce_0 41# happyReduction_108 happyReduction_108 = happyIn47 ([] ) happyReduce_109 = happySpecReduce_1 41# happyReduction_109 happyReduction_109 happy_x_1 = case happyOut46 happy_x_1 of { happy_var_1 -> happyIn47 (happy_var_1 )} happyReduce_110 = happySpecReduce_3 41# happyReduction_110 happyReduction_110 happy_x_3 happy_x_2 happy_x_1 = case happyOut46 happy_x_1 of { happy_var_1 -> case happyOut47 happy_x_3 of { happy_var_3 -> happyIn47 (happy_var_1 ++ happy_var_3 )}} happyReduce_111 = happySpecReduce_3 42# happyReduction_111 happyReduction_111 happy_x_3 happy_x_2 happy_x_1 = case happyOut49 happy_x_1 of { happy_var_1 -> case happyOut48 happy_x_3 of { happy_var_3 -> happyIn48 (FV [happy_var_1,happy_var_3] )}} happyReduce_112 = happyReduce 4# 42# happyReduction_112 happyReduction_112 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut68 happy_x_2 of { happy_var_2 -> case happyOut48 happy_x_4 of { happy_var_4 -> happyIn48 (mkAbs happy_var_2 happy_var_4 ) `HappyStk` happyRest}} happyReduce_113 = happyReduce 4# 42# happyReduction_113 happyReduction_113 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut68 happy_x_2 of { happy_var_2 -> case happyOut48 happy_x_4 of { happy_var_4 -> happyIn48 (mkCTable happy_var_2 happy_var_4 ) `HappyStk` happyRest}} happyReduce_114 = happySpecReduce_3 42# happyReduction_114 happyReduction_114 happy_x_3 happy_x_2 happy_x_1 = case happyOut69 happy_x_1 of { happy_var_1 -> case happyOut48 happy_x_3 of { happy_var_3 -> happyIn48 (mkProdSimple happy_var_1 happy_var_3 )}} happyReduce_115 = happySpecReduce_3 42# happyReduction_115 happyReduction_115 happy_x_3 happy_x_2 happy_x_1 = case happyOut51 happy_x_1 of { happy_var_1 -> case happyOut48 happy_x_3 of { happy_var_3 -> happyIn48 (Table happy_var_1 happy_var_3 )}} happyReduce_116 = happyMonadReduce 6# 42# happyReduction_116 happyReduction_116 (happy_x_6 `HappyStk` happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOut47 happy_x_3 of { happy_var_3 -> case happyOut48 happy_x_6 of { happy_var_6 -> ( do defs <- mapM tryLoc happy_var_3 return $ mkLet defs happy_var_6)}} ) (\r -> happyReturn (happyIn48 r)) happyReduce_117 = happyMonadReduce 4# 42# happyReduction_117 happyReduction_117 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOut47 happy_x_2 of { happy_var_2 -> case happyOut48 happy_x_4 of { happy_var_4 -> ( do defs <- mapM tryLoc happy_var_2 return $ mkLet defs happy_var_4)}} ) (\r -> happyReturn (happyIn48 r)) happyReduce_118 = happyMonadReduce 5# 42# happyReduction_118 happyReduction_118 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOut51 happy_x_1 of { happy_var_1 -> case happyOut47 happy_x_4 of { happy_var_4 -> ( do defs <- mapM tryLoc happy_var_4 return $ mkLet defs happy_var_1)}} ) (\r -> happyReturn (happyIn48 r)) happyReduce_119 = happySpecReduce_3 42# happyReduction_119 happyReduction_119 happy_x_3 happy_x_2 happy_x_1 = case happyOut53 happy_x_2 of { happy_var_2 -> case happyOutTok happy_x_3 of { ((T_String happy_var_3)) -> happyIn48 (Example happy_var_2 happy_var_3 )}} happyReduce_120 = happySpecReduce_1 42# happyReduction_120 happyReduction_120 happy_x_1 = case happyOut49 happy_x_1 of { happy_var_1 -> happyIn48 (happy_var_1 )} happyReduce_121 = happySpecReduce_3 43# happyReduction_121 happyReduction_121 happy_x_3 happy_x_2 happy_x_1 = case happyOut50 happy_x_1 of { happy_var_1 -> case happyOut49 happy_x_3 of { happy_var_3 -> happyIn49 (C happy_var_1 happy_var_3 )}} happyReduce_122 = happySpecReduce_1 43# happyReduction_122 happyReduction_122 happy_x_1 = case happyOut50 happy_x_1 of { happy_var_1 -> happyIn49 (happy_var_1 )} happyReduce_123 = happySpecReduce_3 44# happyReduction_123 happyReduction_123 happy_x_3 happy_x_2 happy_x_1 = case happyOut51 happy_x_1 of { happy_var_1 -> case happyOut50 happy_x_3 of { happy_var_3 -> happyIn50 (Glue happy_var_1 happy_var_3 )}} happyReduce_124 = happySpecReduce_1 44# happyReduction_124 happyReduction_124 happy_x_1 = case happyOut51 happy_x_1 of { happy_var_1 -> happyIn50 (happy_var_1 )} happyReduce_125 = happySpecReduce_3 45# happyReduction_125 happyReduction_125 happy_x_3 happy_x_2 happy_x_1 = case happyOut51 happy_x_1 of { happy_var_1 -> case happyOut52 happy_x_3 of { happy_var_3 -> happyIn51 (S happy_var_1 happy_var_3 )}} happyReduce_126 = happyReduce 4# 45# happyReduction_126 happyReduction_126 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut73 happy_x_3 of { happy_var_3 -> happyIn51 (T TRaw happy_var_3 ) `HappyStk` happyRest} happyReduce_127 = happyReduce 5# 45# happyReduction_127 happyReduction_127 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut54 happy_x_2 of { happy_var_2 -> case happyOut73 happy_x_4 of { happy_var_4 -> happyIn51 (T (TTyped happy_var_2) happy_var_4 ) `HappyStk` happyRest}} happyReduce_128 = happyReduce 5# 45# happyReduction_128 happyReduction_128 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut54 happy_x_2 of { happy_var_2 -> case happyOut55 happy_x_4 of { happy_var_4 -> happyIn51 (V happy_var_2 happy_var_4 ) `HappyStk` happyRest}} happyReduce_129 = happySpecReduce_3 45# happyReduction_129 happyReduction_129 happy_x_3 happy_x_2 happy_x_1 = case happyOut51 happy_x_1 of { happy_var_1 -> case happyOut52 happy_x_3 of { happy_var_3 -> happyIn51 (case happy_var_1 of RecType xs -> RecType (xs ++ [(tupleLabel (length xs+1),happy_var_3)]) t -> RecType [(tupleLabel 1,happy_var_1), (tupleLabel 2,happy_var_3)] )}} happyReduce_130 = happySpecReduce_3 45# happyReduction_130 happyReduction_130 happy_x_3 happy_x_2 happy_x_1 = case happyOut51 happy_x_1 of { happy_var_1 -> case happyOut52 happy_x_3 of { happy_var_3 -> happyIn51 (ExtR happy_var_1 happy_var_3 )}} happyReduce_131 = happySpecReduce_1 45# happyReduction_131 happyReduction_131 happy_x_1 = case happyOut52 happy_x_1 of { happy_var_1 -> happyIn51 (happy_var_1 )} happyReduce_132 = happySpecReduce_2 46# happyReduction_132 happyReduction_132 happy_x_2 happy_x_1 = case happyOut52 happy_x_1 of { happy_var_1 -> case happyOut53 happy_x_2 of { happy_var_2 -> happyIn52 (App happy_var_1 happy_var_2 )}} happyReduce_133 = happyReduce 6# 46# happyReduction_133 happyReduction_133 (happy_x_6 `HappyStk` happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut48 happy_x_2 of { happy_var_2 -> case happyOut73 happy_x_5 of { happy_var_5 -> happyIn52 (let annot = case happy_var_2 of Typed _ t -> TTyped t _ -> TRaw in S (T annot happy_var_5) happy_var_2 ) `HappyStk` happyRest}} happyReduce_134 = happyReduce 4# 46# happyReduction_134 happyReduction_134 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut55 happy_x_3 of { happy_var_3 -> happyIn52 (FV happy_var_3 ) `HappyStk` happyRest} happyReduce_135 = happyMonadReduce 4# 46# happyReduction_135 happyReduction_135 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOut73 happy_x_3 of { happy_var_3 -> ( mkAlts happy_var_3)} ) (\r -> happyReturn (happyIn52 r)) happyReduce_136 = happyReduce 6# 46# happyReduction_136 happyReduction_136 (happy_x_6 `HappyStk` happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOutTok happy_x_3 of { ((T_String happy_var_3)) -> case happyOut75 happy_x_5 of { happy_var_5 -> happyIn52 (Alts (K happy_var_3, happy_var_5) ) `HappyStk` happyRest}} happyReduce_137 = happyReduce 6# 46# happyReduction_137 happyReduction_137 (happy_x_6 `HappyStk` happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOutTok happy_x_3 of { ((T_Ident happy_var_3)) -> case happyOut75 happy_x_5 of { happy_var_5 -> happyIn52 (Alts (Vr happy_var_3, happy_var_5) ) `HappyStk` happyRest}} happyReduce_138 = happyReduce 4# 46# happyReduction_138 happyReduction_138 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut55 happy_x_3 of { happy_var_3 -> happyIn52 (Strs happy_var_3 ) `HappyStk` happyRest} happyReduce_139 = happySpecReduce_2 46# happyReduction_139 happyReduction_139 happy_x_2 happy_x_1 = case happyOut59 happy_x_2 of { happy_var_2 -> happyIn52 (EPatt happy_var_2 )} happyReduce_140 = happySpecReduce_2 46# happyReduction_140 happyReduction_140 happy_x_2 happy_x_1 = case happyOut53 happy_x_2 of { happy_var_2 -> happyIn52 (EPattType happy_var_2 )} happyReduce_141 = happySpecReduce_3 46# happyReduction_141 happyReduction_141 happy_x_3 happy_x_2 happy_x_1 = case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> case happyOut53 happy_x_3 of { happy_var_3 -> happyIn52 (ELincat happy_var_2 happy_var_3 )}} happyReduce_142 = happySpecReduce_3 46# happyReduction_142 happyReduction_142 happy_x_3 happy_x_2 happy_x_1 = case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> case happyOut53 happy_x_3 of { happy_var_3 -> happyIn52 (ELin happy_var_2 happy_var_3 )}} happyReduce_143 = happySpecReduce_1 46# happyReduction_143 happyReduction_143 happy_x_1 = case happyOut53 happy_x_1 of { happy_var_1 -> happyIn52 (happy_var_1 )} happyReduce_144 = happySpecReduce_3 47# happyReduction_144 happyReduction_144 happy_x_3 happy_x_2 happy_x_1 = case happyOut53 happy_x_1 of { happy_var_1 -> case happyOut62 happy_x_3 of { happy_var_3 -> happyIn53 (P happy_var_1 happy_var_3 )}} happyReduce_145 = happySpecReduce_1 47# happyReduction_145 happyReduction_145 happy_x_1 = case happyOut54 happy_x_1 of { happy_var_1 -> happyIn53 (happy_var_1 )} happyReduce_146 = happySpecReduce_1 48# happyReduction_146 happyReduction_146 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> happyIn54 (Vr happy_var_1 )} happyReduce_147 = happySpecReduce_1 48# happyReduction_147 happyReduction_147 happy_x_1 = case happyOut63 happy_x_1 of { happy_var_1 -> happyIn54 (Sort happy_var_1 )} happyReduce_148 = happySpecReduce_1 48# happyReduction_148 happyReduction_148 happy_x_1 = case happyOutTok happy_x_1 of { ((T_String happy_var_1)) -> happyIn54 (K happy_var_1 )} happyReduce_149 = happySpecReduce_1 48# happyReduction_149 happyReduction_149 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Integer happy_var_1)) -> happyIn54 (EInt happy_var_1 )} happyReduce_150 = happySpecReduce_1 48# happyReduction_150 happyReduction_150 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Double happy_var_1)) -> happyIn54 (EFloat happy_var_1 )} happyReduce_151 = happySpecReduce_1 48# happyReduction_151 happyReduction_151 happy_x_1 = happyIn54 (Meta (int2meta 0) ) happyReduce_152 = happySpecReduce_2 48# happyReduction_152 happyReduction_152 happy_x_2 happy_x_1 = happyIn54 (Empty ) happyReduce_153 = happyReduce 4# 48# happyReduction_153 happyReduction_153 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> case happyOut56 happy_x_3 of { happy_var_3 -> happyIn54 (foldl App (Vr (mkListId happy_var_2)) happy_var_3 ) `HappyStk` happyRest}} happyReduce_154 = happySpecReduce_3 48# happyReduction_154 happyReduction_154 happy_x_3 happy_x_2 happy_x_1 = case happyOutTok happy_x_2 of { ((T_String happy_var_2)) -> happyIn54 (case happy_var_2 of [] -> Empty str -> foldr1 C (map K (words str)) )} happyReduce_155 = happyMonadReduce 3# 48# happyReduction_155 happyReduction_155 (happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOut47 happy_x_2 of { happy_var_2 -> ( mkR happy_var_2)} ) (\r -> happyReturn (happyIn54 r)) happyReduce_156 = happySpecReduce_3 48# happyReduction_156 happyReduction_156 happy_x_3 happy_x_2 happy_x_1 = case happyOut70 happy_x_2 of { happy_var_2 -> happyIn54 (R (tuple2record happy_var_2) )} happyReduce_157 = happyReduce 5# 48# happyReduction_157 happyReduction_157 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut48 happy_x_2 of { happy_var_2 -> case happyOut48 happy_x_4 of { happy_var_4 -> happyIn54 (Typed happy_var_2 happy_var_4 ) `HappyStk` happyRest}} happyReduce_158 = happySpecReduce_1 48# happyReduction_158 happyReduction_158 happy_x_1 = case happyOutTok happy_x_1 of { ((T_LString happy_var_1)) -> happyIn54 (K happy_var_1 )} happyReduce_159 = happySpecReduce_3 48# happyReduction_159 happyReduction_159 happy_x_3 happy_x_2 happy_x_1 = case happyOut48 happy_x_2 of { happy_var_2 -> happyIn54 (happy_var_2 )} happyReduce_160 = happySpecReduce_0 49# happyReduction_160 happyReduction_160 = happyIn55 ([] ) happyReduce_161 = happySpecReduce_1 49# happyReduction_161 happyReduction_161 happy_x_1 = case happyOut48 happy_x_1 of { happy_var_1 -> happyIn55 ([happy_var_1] )} happyReduce_162 = happySpecReduce_3 49# happyReduction_162 happyReduction_162 happy_x_3 happy_x_2 happy_x_1 = case happyOut48 happy_x_1 of { happy_var_1 -> case happyOut55 happy_x_3 of { happy_var_3 -> happyIn55 (happy_var_1 : happy_var_3 )}} happyReduce_163 = happySpecReduce_0 50# happyReduction_163 happyReduction_163 = happyIn56 ([] ) happyReduce_164 = happySpecReduce_2 50# happyReduction_164 happyReduction_164 happy_x_2 happy_x_1 = case happyOut54 happy_x_1 of { happy_var_1 -> case happyOut56 happy_x_2 of { happy_var_2 -> happyIn56 (happy_var_1 : happy_var_2 )}} happyReduce_165 = happySpecReduce_3 51# happyReduction_165 happyReduction_165 happy_x_3 happy_x_2 happy_x_1 = case happyOut57 happy_x_1 of { happy_var_1 -> case happyOut58 happy_x_3 of { happy_var_3 -> happyIn57 (PAlt happy_var_1 happy_var_3 )}} happyReduce_166 = happySpecReduce_3 51# happyReduction_166 happyReduction_166 happy_x_3 happy_x_2 happy_x_1 = case happyOut57 happy_x_1 of { happy_var_1 -> case happyOut58 happy_x_3 of { happy_var_3 -> happyIn57 (PSeq happy_var_1 happy_var_3 )}} happyReduce_167 = happySpecReduce_1 51# happyReduction_167 happyReduction_167 happy_x_1 = case happyOut58 happy_x_1 of { happy_var_1 -> happyIn57 (happy_var_1 )} happyReduce_168 = happySpecReduce_2 52# happyReduction_168 happyReduction_168 happy_x_2 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> case happyOut65 happy_x_2 of { happy_var_2 -> happyIn58 (PC happy_var_1 happy_var_2 )}} happyReduce_169 = happyReduce 4# 52# happyReduction_169 happyReduction_169 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> case happyOutTok happy_x_3 of { ((T_Ident happy_var_3)) -> case happyOut65 happy_x_4 of { happy_var_4 -> happyIn58 (PP happy_var_1 happy_var_3 happy_var_4 ) `HappyStk` happyRest}}} happyReduce_170 = happySpecReduce_2 52# happyReduction_170 happyReduction_170 happy_x_2 happy_x_1 = case happyOut59 happy_x_1 of { happy_var_1 -> happyIn58 (PRep happy_var_1 )} happyReduce_171 = happySpecReduce_3 52# happyReduction_171 happyReduction_171 happy_x_3 happy_x_2 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> case happyOut59 happy_x_3 of { happy_var_3 -> happyIn58 (PAs happy_var_1 happy_var_3 )}} happyReduce_172 = happySpecReduce_2 52# happyReduction_172 happyReduction_172 happy_x_2 happy_x_1 = case happyOut59 happy_x_2 of { happy_var_2 -> happyIn58 (PNeg happy_var_2 )} happyReduce_173 = happySpecReduce_1 52# happyReduction_173 happyReduction_173 happy_x_1 = case happyOut59 happy_x_1 of { happy_var_1 -> happyIn58 (happy_var_1 )} happyReduce_174 = happySpecReduce_1 53# happyReduction_174 happyReduction_174 happy_x_1 = happyIn59 (PChar ) happyReduce_175 = happySpecReduce_3 53# happyReduction_175 happyReduction_175 happy_x_3 happy_x_2 happy_x_1 = case happyOutTok happy_x_2 of { ((T_String happy_var_2)) -> happyIn59 (PChars happy_var_2 )} happyReduce_176 = happySpecReduce_2 53# happyReduction_176 happyReduction_176 happy_x_2 happy_x_1 = case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> happyIn59 (PMacro happy_var_2 )} happyReduce_177 = happyReduce 4# 53# happyReduction_177 happyReduction_177 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> case happyOutTok happy_x_4 of { ((T_Ident happy_var_4)) -> happyIn59 (PM happy_var_2 happy_var_4 ) `HappyStk` happyRest}} happyReduce_178 = happySpecReduce_1 53# happyReduction_178 happyReduction_178 happy_x_1 = happyIn59 (PW ) happyReduce_179 = happySpecReduce_1 53# happyReduction_179 happyReduction_179 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> happyIn59 (PV happy_var_1 )} happyReduce_180 = happySpecReduce_3 53# happyReduction_180 happyReduction_180 happy_x_3 happy_x_2 happy_x_1 = case happyOutTok happy_x_2 of { ((T_Ident happy_var_2)) -> happyIn59 (PC happy_var_2 [] )} happyReduce_181 = happySpecReduce_3 53# happyReduction_181 happyReduction_181 happy_x_3 happy_x_2 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> case happyOutTok happy_x_3 of { ((T_Ident happy_var_3)) -> happyIn59 (PP happy_var_1 happy_var_3 [] )}} happyReduce_182 = happySpecReduce_1 53# happyReduction_182 happyReduction_182 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Integer happy_var_1)) -> happyIn59 (PInt happy_var_1 )} happyReduce_183 = happySpecReduce_1 53# happyReduction_183 happyReduction_183 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Double happy_var_1)) -> happyIn59 (PFloat happy_var_1 )} happyReduce_184 = happySpecReduce_1 53# happyReduction_184 happyReduction_184 happy_x_1 = case happyOutTok happy_x_1 of { ((T_String happy_var_1)) -> happyIn59 (PString happy_var_1 )} happyReduce_185 = happySpecReduce_3 53# happyReduction_185 happyReduction_185 happy_x_3 happy_x_2 happy_x_1 = case happyOut64 happy_x_2 of { happy_var_2 -> happyIn59 (PR happy_var_2 )} happyReduce_186 = happySpecReduce_3 53# happyReduction_186 happyReduction_186 happy_x_3 happy_x_2 happy_x_1 = case happyOut71 happy_x_2 of { happy_var_2 -> happyIn59 ((PR . tuple2recordPatt) happy_var_2 )} happyReduce_187 = happySpecReduce_3 53# happyReduction_187 happyReduction_187 happy_x_3 happy_x_2 happy_x_1 = case happyOut57 happy_x_2 of { happy_var_2 -> happyIn59 (happy_var_2 )} happyReduce_188 = happySpecReduce_1 54# happyReduction_188 happyReduction_188 happy_x_1 = happyIn60 (identW ) happyReduce_189 = happySpecReduce_1 54# happyReduction_189 happyReduction_189 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> happyIn60 (happy_var_1 )} happyReduce_190 = happySpecReduce_3 55# happyReduction_190 happyReduction_190 happy_x_3 happy_x_2 happy_x_1 = case happyOut43 happy_x_1 of { happy_var_1 -> case happyOut57 happy_x_3 of { happy_var_3 -> happyIn61 ([(LIdent (ident2bs i),happy_var_3) | i <- happy_var_1] )}} happyReduce_191 = happySpecReduce_1 56# happyReduction_191 happyReduction_191 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> happyIn62 (LIdent (ident2bs happy_var_1) )} happyReduce_192 = happySpecReduce_2 56# happyReduction_192 happyReduction_192 happy_x_2 happy_x_1 = case happyOutTok happy_x_2 of { ((T_Integer happy_var_2)) -> happyIn62 (LVar (fromIntegral happy_var_2) )} happyReduce_193 = happySpecReduce_1 57# happyReduction_193 happyReduction_193 happy_x_1 = happyIn63 (cType ) happyReduce_194 = happySpecReduce_1 57# happyReduction_194 happyReduction_194 happy_x_1 = happyIn63 (cPType ) happyReduce_195 = happySpecReduce_1 57# happyReduction_195 happyReduction_195 happy_x_1 = happyIn63 (cTok ) happyReduce_196 = happySpecReduce_1 57# happyReduction_196 happyReduction_196 happy_x_1 = happyIn63 (cStr ) happyReduce_197 = happySpecReduce_1 57# happyReduction_197 happyReduction_197 happy_x_1 = happyIn63 (cStrs ) happyReduce_198 = happySpecReduce_0 58# happyReduction_198 happyReduction_198 = happyIn64 ([] ) happyReduce_199 = happySpecReduce_1 58# happyReduction_199 happyReduction_199 happy_x_1 = case happyOut61 happy_x_1 of { happy_var_1 -> happyIn64 (happy_var_1 )} happyReduce_200 = happySpecReduce_3 58# happyReduction_200 happyReduction_200 happy_x_3 happy_x_2 happy_x_1 = case happyOut61 happy_x_1 of { happy_var_1 -> case happyOut64 happy_x_3 of { happy_var_3 -> happyIn64 (happy_var_1 ++ happy_var_3 )}} happyReduce_201 = happySpecReduce_1 59# happyReduction_201 happyReduction_201 happy_x_1 = case happyOut59 happy_x_1 of { happy_var_1 -> happyIn65 ([happy_var_1] )} happyReduce_202 = happySpecReduce_2 59# happyReduction_202 happyReduction_202 happy_x_2 happy_x_1 = case happyOut59 happy_x_1 of { happy_var_1 -> case happyOut65 happy_x_2 of { happy_var_2 -> happyIn65 (happy_var_1 : happy_var_2 )}} happyReduce_203 = happySpecReduce_1 60# happyReduction_203 happyReduction_203 happy_x_1 = case happyOut60 happy_x_1 of { happy_var_1 -> happyIn66 ([happy_var_1] )} happyReduce_204 = happySpecReduce_2 60# happyReduction_204 happyReduction_204 happy_x_2 happy_x_1 = case happyOut60 happy_x_1 of { happy_var_1 -> case happyOut66 happy_x_2 of { happy_var_2 -> happyIn66 (happy_var_1 : happy_var_2 )}} happyReduce_205 = happySpecReduce_1 61# happyReduction_205 happyReduction_205 happy_x_1 = case happyOutTok happy_x_1 of { ((T_Ident happy_var_1)) -> happyIn67 (happy_var_1 )} happyReduce_206 = happySpecReduce_1 61# happyReduction_206 happyReduction_206 happy_x_1 = happyIn67 (identW ) happyReduce_207 = happySpecReduce_1 62# happyReduction_207 happyReduction_207 happy_x_1 = case happyOut67 happy_x_1 of { happy_var_1 -> happyIn68 ([happy_var_1] )} happyReduce_208 = happySpecReduce_3 62# happyReduction_208 happyReduction_208 happy_x_3 happy_x_2 happy_x_1 = case happyOut67 happy_x_1 of { happy_var_1 -> case happyOut68 happy_x_3 of { happy_var_3 -> happyIn68 (happy_var_1 : happy_var_3 )}} happyReduce_209 = happyReduce 5# 63# happyReduction_209 happyReduction_209 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut68 happy_x_2 of { happy_var_2 -> case happyOut48 happy_x_4 of { happy_var_4 -> happyIn69 ([(x,happy_var_4) | x <- happy_var_2] ) `HappyStk` happyRest}} happyReduce_210 = happySpecReduce_1 63# happyReduction_210 happyReduction_210 happy_x_1 = case happyOut52 happy_x_1 of { happy_var_1 -> happyIn69 ([mkDecl happy_var_1] )} happyReduce_211 = happySpecReduce_0 64# happyReduction_211 happyReduction_211 = happyIn70 ([] ) happyReduce_212 = happySpecReduce_1 64# happyReduction_212 happyReduction_212 happy_x_1 = case happyOut48 happy_x_1 of { happy_var_1 -> happyIn70 ([happy_var_1] )} happyReduce_213 = happySpecReduce_3 64# happyReduction_213 happyReduction_213 happy_x_3 happy_x_2 happy_x_1 = case happyOut48 happy_x_1 of { happy_var_1 -> case happyOut70 happy_x_3 of { happy_var_3 -> happyIn70 (happy_var_1 : happy_var_3 )}} happyReduce_214 = happySpecReduce_0 65# happyReduction_214 happyReduction_214 = happyIn71 ([] ) happyReduce_215 = happySpecReduce_1 65# happyReduction_215 happyReduction_215 happy_x_1 = case happyOut57 happy_x_1 of { happy_var_1 -> happyIn71 ([happy_var_1] )} happyReduce_216 = happySpecReduce_3 65# happyReduction_216 happyReduction_216 happy_x_3 happy_x_2 happy_x_1 = case happyOut57 happy_x_1 of { happy_var_1 -> case happyOut71 happy_x_3 of { happy_var_3 -> happyIn71 (happy_var_1 : happy_var_3 )}} happyReduce_217 = happySpecReduce_3 66# happyReduction_217 happyReduction_217 happy_x_3 happy_x_2 happy_x_1 = case happyOut57 happy_x_1 of { happy_var_1 -> case happyOut48 happy_x_3 of { happy_var_3 -> happyIn72 ((happy_var_1,happy_var_3) )}} happyReduce_218 = happySpecReduce_1 67# happyReduction_218 happyReduction_218 happy_x_1 = case happyOut72 happy_x_1 of { happy_var_1 -> happyIn73 ([happy_var_1] )} happyReduce_219 = happySpecReduce_3 67# happyReduction_219 happyReduction_219 happy_x_3 happy_x_2 happy_x_1 = case happyOut72 happy_x_1 of { happy_var_1 -> case happyOut73 happy_x_3 of { happy_var_3 -> happyIn73 (happy_var_1 : happy_var_3 )}} happyReduce_220 = happySpecReduce_3 68# happyReduction_220 happyReduction_220 happy_x_3 happy_x_2 happy_x_1 = case happyOut48 happy_x_1 of { happy_var_1 -> case happyOut48 happy_x_3 of { happy_var_3 -> happyIn74 ((happy_var_1,happy_var_3) )}} happyReduce_221 = happySpecReduce_1 69# happyReduction_221 happyReduction_221 happy_x_1 = case happyOut74 happy_x_1 of { happy_var_1 -> happyIn75 ([happy_var_1] )} happyReduce_222 = happySpecReduce_3 69# happyReduction_222 happyReduction_222 happy_x_3 happy_x_2 happy_x_1 = case happyOut74 happy_x_1 of { happy_var_1 -> case happyOut75 happy_x_3 of { happy_var_3 -> happyIn75 (happy_var_1 : happy_var_3 )}} happyReduce_223 = happyReduce 5# 70# happyReduction_223 happyReduction_223 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut68 happy_x_2 of { happy_var_2 -> case happyOut48 happy_x_4 of { happy_var_4 -> happyIn76 ([(x,happy_var_4) | x <- happy_var_2] ) `HappyStk` happyRest}} happyReduce_224 = happySpecReduce_1 70# happyReduction_224 happyReduction_224 happy_x_1 = case happyOut54 happy_x_1 of { happy_var_1 -> happyIn76 ([mkDecl happy_var_1] )} happyReduce_225 = happySpecReduce_0 71# happyReduction_225 happyReduction_225 = happyIn77 ([] ) happyReduce_226 = happySpecReduce_2 71# happyReduction_226 happyReduction_226 happy_x_2 happy_x_1 = case happyOut76 happy_x_1 of { happy_var_1 -> case happyOut77 happy_x_2 of { happy_var_2 -> happyIn77 (happy_var_1 ++ happy_var_2 )}} happyReduce_227 = happyMonadReduce 0# 72# happyReduction_227 happyReduction_227 (happyRest) tk = happyThen (( getPosn) ) (\r -> happyReturn (happyIn78 r)) happyNewToken action sts stk = lexer(\tk -> let cont i = happyDoAction i tk action sts stk in case tk of { T_EOF -> happyDoAction 71# tk action sts stk; T_exclmark -> cont 1#; T_patt -> cont 2#; T_int_label -> cont 3#; T_oparen -> cont 4#; T_cparen -> cont 5#; T_star -> cont 6#; T_starstar -> cont 7#; T_plus -> cont 8#; T_plusplus -> cont 9#; T_comma -> cont 10#; T_minus -> cont 11#; T_rarrow -> cont 12#; T_dot -> cont 13#; T_alt -> cont 14#; T_colon -> cont 15#; T_semicolon -> cont 16#; T_less -> cont 17#; T_equal -> cont 18#; T_big_rarrow -> cont 19#; T_great -> cont 20#; T_questmark -> cont 21#; T_at -> cont 22#; T_obrack -> cont 23#; T_cbrack -> cont 24#; T_ocurly -> cont 25#; T_ccurly -> cont 26#; T_lam -> cont 27#; T_lamlam -> cont 28#; T_underscore -> cont 29#; T_bar -> cont 30#; T_PType -> cont 31#; T_Str -> cont 32#; T_Strs -> cont 33#; T_Tok -> cont 34#; T_Type -> cont 35#; T_abstract -> cont 36#; T_case -> cont 37#; T_cat -> cont 38#; T_concrete -> cont 39#; T_data -> cont 40#; T_def -> cont 41#; T_flags -> cont 42#; T_fun -> cont 43#; T_in -> cont 44#; T_incomplete -> cont 45#; T_instance -> cont 46#; T_interface -> cont 47#; T_let -> cont 48#; T_lin -> cont 49#; T_lincat -> cont 50#; T_lindef -> cont 51#; T_of -> cont 52#; T_open -> cont 53#; T_oper -> cont 54#; T_param -> cont 55#; T_pattern -> cont 56#; T_pre -> cont 57#; T_printname -> cont 58#; T_resource -> cont 59#; T_strs -> cont 60#; T_table -> cont 61#; T_transfer -> cont 62#; T_variants -> cont 63#; T_where -> cont 64#; T_with -> cont 65#; (T_Integer happy_dollar_dollar) -> cont 66#; (T_Double happy_dollar_dollar) -> cont 67#; (T_String happy_dollar_dollar) -> cont 68#; (T_LString happy_dollar_dollar) -> cont 69#; (T_Ident happy_dollar_dollar) -> cont 70#; _ -> happyError' tk }) happyError_ tk = happyError' tk happyThen :: () => P a -> (a -> P b) -> P b happyThen = (>>=) happyReturn :: () => a -> P a happyReturn = (return) happyThen1 = happyThen happyReturn1 :: () => a -> P a happyReturn1 = happyReturn happyError' :: () => Token -> P a happyError' tk = (\token -> happyError) tk pModDef = happySomeParser where happySomeParser = happyThen (happyParse 0#) (\x -> happyReturn (happyOut6 x)) pModHeader = happySomeParser where happySomeParser = happyThen (happyParse 1#) (\x -> happyReturn (happyOut7 x)) pExp = happySomeParser where happySomeParser = happyThen (happyParse 2#) (\x -> happyReturn (happyOut48 x)) happySeq = happyDontSeq happyError :: P a happyError = fail "parse error" mkListId,mkConsId,mkBaseId :: Ident -> Ident mkListId = prefixId (BS.pack "List") mkConsId = prefixId (BS.pack "Cons") mkBaseId = prefixId (BS.pack "Base") prefixId :: BS.ByteString -> Ident -> Ident prefixId pref id = identC (BS.append pref (ident2bs id)) listCatDef id pos cont size = [catd,nilfund,consfund] where listId = mkListId id baseId = mkBaseId id consId = mkConsId id catd = (listId, pos, AbsCat (Just cont') (Just [Cn baseId,Cn consId])) nilfund = (baseId, pos, AbsFun (Just niltyp) Nothing Nothing) consfund = (consId, pos, AbsFun (Just constyp) Nothing Nothing) cont' = [(mkId x i,ty) | (i,(x,ty)) <- zip [0..] cont] xs = map (Vr . fst) cont' cd = mkDecl (mkApp (Vr id) xs) lc = mkApp (Vr listId) xs niltyp = mkProdSimple (cont' ++ replicate size cd) lc constyp = mkProdSimple (cont' ++ [cd, mkDecl lc]) lc mkId x i = if isWildIdent x then (varX i) else x tryLoc (c,mty,Just e) = return (c,(mty,e)) tryLoc (c,_ ,_ ) = fail ("local definition of" +++ prIdent c +++ "without value") mkR [] = return $ RecType [] --- empty record always interpreted as record type mkR fs@(f:_) = case f of (lab,Just ty,Nothing) -> mapM tryRT fs >>= return . RecType _ -> mapM tryR fs >>= return . R where tryRT (lab,Just ty,Nothing) = return (ident2label lab,ty) tryRT (lab,_ ,_ ) = fail $ "illegal record type field" +++ prIdent lab --- manifest fields ?! tryR (lab,mty,Just t) = return (ident2label lab,(mty,t)) tryR (lab,_ ,_ ) = fail $ "illegal record field" +++ prIdent lab mkOverload pdt pdf@(Just df) = case appForm df of (keyw, ts@(_:_)) | isOverloading keyw -> case last ts of R fs -> [ResOverload [m | Vr m <- ts] [(ty,fu) | (_,(Just ty,fu)) <- fs]] _ -> [ResOper pdt pdf] _ -> [ResOper pdt pdf] -- to enable separare type signature --- not type-checked mkOverload pdt@(Just df) pdf = case appForm df of (keyw, ts@(_:_)) | isOverloading keyw -> case last ts of RecType _ -> [] _ -> [ResOper pdt pdf] _ -> [ResOper pdt pdf] mkOverload pdt pdf = [ResOper pdt pdf] isOverloading t = case t of Vr keyw | prIdent keyw == "overload" -> True -- overload is a "soft keyword" _ -> False type SrcSpan = (Posn,Posn) checkInfoType MTAbstract (id,pos,info) = case info of AbsCat _ _ -> return () AbsFun _ _ _ -> return () _ -> failLoc (fst pos) "illegal definition in abstract module" checkInfoType MTResource (id,pos,info) = case info of ResParam _ -> return () ResValue _ -> return () ResOper _ _ -> return () ResOverload _ _ -> return () _ -> failLoc (fst pos) "illegal definition in resource module" checkInfoType MTInterface (id,pos,info) = case info of ResParam _ -> return () ResValue _ -> return () ResOper _ _ -> return () ResOverload _ _ -> return () _ -> failLoc (fst pos) "illegal definition in interface module" checkInfoType (MTConcrete _) (id,pos,info) = case info of CncCat _ _ _ -> return () CncFun _ _ _ -> return () ResParam _ -> return () ResValue _ -> return () ResOper _ _ -> return () ResOverload _ _ -> return () _ -> failLoc (fst pos) "illegal definition in concrete module" checkInfoType (MTInstance _) (id,pos,info) = case info of ResParam _ -> return () ResValue _ -> return () ResOper _ _ -> return () _ -> failLoc (fst pos) "illegal definition in instance module" checkInfoType (MTTransfer _ _) (id,pos,info) = case info of AbsCat _ _ -> return () AbsFun _ _ _ -> return () _ -> failLoc (fst pos) "illegal definition in transfer module" mkAlts cs = case cs of _:_ -> do def <- mkDef (last cs) alts <- mapM mkAlt (init cs) return (Alts (def,alts)) _ -> fail "empty alts" where mkDef (_,t) = return t mkAlt (p,t) = do ss <- mkStrs p return (t,ss) mkStrs p = case p of PAlt a b -> do Strs as <- mkStrs a Strs bs <- mkStrs b return $ Strs $ as ++ bs PString s -> return $ Strs [K s] PV x -> return (Vr x) --- for macros; not yet complete PMacro x -> return (Vr x) --- for macros; not yet complete PM m c -> return (Q m c) --- for macros; not yet complete _ -> fail "no strs from pattern" {-# LINE 1 "GenericTemplate.hs" #-} {-# LINE 1 "" #-} {-# LINE 1 "" #-} {-# LINE 1 "GenericTemplate.hs" #-} -- Id: GenericTemplate.hs,v 1.26 2005/01/14 14:47:22 simonmar Exp {-# LINE 28 "GenericTemplate.hs" #-} data Happy_IntList = HappyCons Int# Happy_IntList {-# LINE 49 "GenericTemplate.hs" #-} {-# LINE 59 "GenericTemplate.hs" #-} {-# LINE 68 "GenericTemplate.hs" #-} infixr 9 `HappyStk` data HappyStk a = HappyStk a (HappyStk a) ----------------------------------------------------------------------------- -- starting the parse happyParse start_state = happyNewToken start_state notHappyAtAll notHappyAtAll ----------------------------------------------------------------------------- -- Accepting the parse -- If the current token is 0#, it means we've just accepted a partial -- parse (a %partial parser). We must ignore the saved token on the top of -- the stack in this case. happyAccept 0# tk st sts (_ `HappyStk` ans `HappyStk` _) = happyReturn1 ans happyAccept j tk st sts (HappyStk ans _) = (happyTcHack j (happyTcHack st)) (happyReturn1 ans) ----------------------------------------------------------------------------- -- Arrays only: do the next action happyDoAction i tk st = {- nothing -} case action of 0# -> {- nothing -} happyFail i tk st -1# -> {- nothing -} happyAccept i tk st n | (n <# (0# :: Int#)) -> {- nothing -} (happyReduceArr ! rule) i tk st where rule = (I# ((negateInt# ((n +# (1# :: Int#)))))) n -> {- nothing -} happyShift new_state i tk st where new_state = (n -# (1# :: Int#)) where off = indexShortOffAddr happyActOffsets st off_i = (off +# i) check = if (off_i >=# (0# :: Int#)) then (indexShortOffAddr happyCheck off_i ==# i) else False action | check = indexShortOffAddr happyTable off_i | otherwise = indexShortOffAddr happyDefActions st {-# LINE 127 "GenericTemplate.hs" #-} indexShortOffAddr (HappyA# arr) off = #if __GLASGOW_HASKELL__ > 500 narrow16Int# i #elif __GLASGOW_HASKELL__ == 500 intToInt16# i #else (i `iShiftL#` 16#) `iShiftRA#` 16# #endif where #if __GLASGOW_HASKELL__ >= 503 i = word2Int# ((high `uncheckedShiftL#` 8#) `or#` low) #else i = word2Int# ((high `shiftL#` 8#) `or#` low) #endif high = int2Word# (ord# (indexCharOffAddr# arr (off' +# 1#))) low = int2Word# (ord# (indexCharOffAddr# arr off')) off' = off *# 2# data HappyAddr = HappyA# Addr# ----------------------------------------------------------------------------- -- HappyState data type (not arrays) {-# LINE 170 "GenericTemplate.hs" #-} ----------------------------------------------------------------------------- -- Shifting a token happyShift new_state 0# tk st sts stk@(x `HappyStk` _) = let i = (case unsafeCoerce# x of { (I# (i)) -> i }) in -- trace "shifting the error token" $ happyDoAction i tk new_state (HappyCons (st) (sts)) (stk) happyShift new_state i tk st sts stk = happyNewToken new_state (HappyCons (st) (sts)) ((happyInTok (tk))`HappyStk`stk) -- happyReduce is specialised for the common cases. happySpecReduce_0 i fn 0# tk st sts stk = happyFail 0# tk st sts stk happySpecReduce_0 nt fn j tk st@((action)) sts stk = happyGoto nt j tk st (HappyCons (st) (sts)) (fn `HappyStk` stk) happySpecReduce_1 i fn 0# tk st sts stk = happyFail 0# tk st sts stk happySpecReduce_1 nt fn j tk _ sts@((HappyCons (st@(action)) (_))) (v1`HappyStk`stk') = let r = fn v1 in happySeq r (happyGoto nt j tk st sts (r `HappyStk` stk')) happySpecReduce_2 i fn 0# tk st sts stk = happyFail 0# tk st sts stk happySpecReduce_2 nt fn j tk _ (HappyCons (_) (sts@((HappyCons (st@(action)) (_))))) (v1`HappyStk`v2`HappyStk`stk') = let r = fn v1 v2 in happySeq r (happyGoto nt j tk st sts (r `HappyStk` stk')) happySpecReduce_3 i fn 0# tk st sts stk = happyFail 0# tk st sts stk happySpecReduce_3 nt fn j tk _ (HappyCons (_) ((HappyCons (_) (sts@((HappyCons (st@(action)) (_))))))) (v1`HappyStk`v2`HappyStk`v3`HappyStk`stk') = let r = fn v1 v2 v3 in happySeq r (happyGoto nt j tk st sts (r `HappyStk` stk')) happyReduce k i fn 0# tk st sts stk = happyFail 0# tk st sts stk happyReduce k nt fn j tk st sts stk = case happyDrop (k -# (1# :: Int#)) sts of sts1@((HappyCons (st1@(action)) (_))) -> let r = fn stk in -- it doesn't hurt to always seq here... happyDoSeq r (happyGoto nt j tk st1 sts1 r) happyMonadReduce k nt fn 0# tk st sts stk = happyFail 0# tk st sts stk happyMonadReduce k nt fn j tk st sts stk = happyThen1 (fn stk tk) (\r -> happyGoto nt j tk st1 sts1 (r `HappyStk` drop_stk)) where sts1@((HappyCons (st1@(action)) (_))) = happyDrop k (HappyCons (st) (sts)) drop_stk = happyDropStk k stk happyMonad2Reduce k nt fn 0# tk st sts stk = happyFail 0# tk st sts stk happyMonad2Reduce k nt fn j tk st sts stk = happyThen1 (fn stk tk) (\r -> happyNewToken new_state sts1 (r `HappyStk` drop_stk)) where sts1@((HappyCons (st1@(action)) (_))) = happyDrop k (HappyCons (st) (sts)) drop_stk = happyDropStk k stk off = indexShortOffAddr happyGotoOffsets st1 off_i = (off +# nt) new_state = indexShortOffAddr happyTable off_i happyDrop 0# l = l happyDrop n (HappyCons (_) (t)) = happyDrop (n -# (1# :: Int#)) t happyDropStk 0# l = l happyDropStk n (x `HappyStk` xs) = happyDropStk (n -# (1#::Int#)) xs ----------------------------------------------------------------------------- -- Moving to a new state after a reduction happyGoto nt j tk st = {- nothing -} happyDoAction j tk new_state where off = indexShortOffAddr happyGotoOffsets st off_i = (off +# nt) new_state = indexShortOffAddr happyTable off_i ----------------------------------------------------------------------------- -- Error recovery (0# is the error token) -- parse error if we are in recovery and we fail again happyFail 0# tk old_st _ stk = -- trace "failing" $ happyError_ tk {- We don't need state discarding for our restricted implementation of "error". In fact, it can cause some bogus parses, so I've disabled it for now --SDM -- discard a state happyFail 0# tk old_st (HappyCons ((action)) (sts)) (saved_tok `HappyStk` _ `HappyStk` stk) = -- trace ("discarding state, depth " ++ show (length stk)) $ happyDoAction 0# tk action sts ((saved_tok`HappyStk`stk)) -} -- Enter error recovery: generate an error token, -- save the old token and carry on. happyFail i tk (action) sts stk = -- trace "entering error recovery" $ happyDoAction 0# tk action sts ( (unsafeCoerce# (I# (i))) `HappyStk` stk) -- Internal happy errors: notHappyAtAll = error "Internal Happy error\n" ----------------------------------------------------------------------------- -- Hack to get the typechecker to accept our action functions happyTcHack :: Int# -> a -> a happyTcHack x y = y {-# INLINE happyTcHack #-} ----------------------------------------------------------------------------- -- Seq-ing. If the --strict flag is given, then Happy emits -- happySeq = happyDoSeq -- otherwise it emits -- happySeq = happyDontSeq happyDoSeq, happyDontSeq :: a -> b -> b happyDoSeq a b = a `seq` b happyDontSeq a b = b ----------------------------------------------------------------------------- -- Don't inline any functions from the template. GHC has a nasty habit -- of deciding to inline happyGoto everywhere, which increases the size of -- the generated parser quite a bit. {-# NOINLINE happyDoAction #-} {-# NOINLINE happyTable #-} {-# NOINLINE happyCheck #-} {-# NOINLINE happyActOffsets #-} {-# NOINLINE happyGotoOffsets #-} {-# NOINLINE happyDefActions #-} {-# NOINLINE happyShift #-} {-# NOINLINE happySpecReduce_0 #-} {-# NOINLINE happySpecReduce_1 #-} {-# NOINLINE happySpecReduce_2 #-} {-# NOINLINE happySpecReduce_3 #-} {-# NOINLINE happyReduce #-} {-# NOINLINE happyMonadReduce #-} {-# NOINLINE happyGoto #-} {-# NOINLINE happyFail #-} -- end of Happy Template.