{-# OPTIONS_GHC -w #-} {-# OPTIONS -fglasgow-exts -cpp #-} {-# OPTIONS_GHC -w #-} {- Copyright (C) HyLoRes 2002-2007. See AUTHORS file This program is free software; you can redistribute it and/or modify it under the terms of the GNU General Public License as published by the Free Software Foundation; either version 2 of the License, or (at your option) any later version. This program is distributed in the hope that it will be useful, but WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License for more details. You should have received a copy of the GNU General Public License along with this program; if not, write to the Free Software Foundation, Inc., 59 Temple Place - Suite 330, Boston, MA 02111-1307, USA. -} module HyLo.InputFile.Parser ( parse, initParseState, ParseState, QueryType(..), RelProperty(..), ParseOutput(..), RelInfo, ProverInfo,InferenceTask, relations, provers, theory, tasks) where import Control.Monad.State import HyLo.InputFile.Lexer ( Token(..), FilePos, line, col ) import HyLo.Signature.String ( StringSignature, PropSymbol(..), NomSymbol(..), RelSymbol(..)) import HyLo.Signature ( Signature, emptySignature, addNomToSig, addPropToSig, addRelToSig, isNomInSig, isPropInSig, isRelInSig) -- since ghc 6.10, "Down" is defined in GHC.Exts, that is included -- (unqualified) in the parser. we need to use Formula.Down instead of -- simply Down to avoid ambiguities... import HyLo.Formula as Formula ( Formula(..), Where(..), CountOp(..) ) import qualified Data.Array as Happy_Data_Array import qualified GHC.Exts as Happy_GHC_Exts import Control.Applicative(Applicative(..)) import Control.Monad (ap) -- parser produced by Happy Version 1.19.5 newtype HappyAbsSyn = HappyAbsSyn HappyAny #if __GLASGOW_HASKELL__ >= 607 type HappyAny = Happy_GHC_Exts.Any #else type HappyAny = forall a . a #endif happyIn4 :: (ParseOutput) -> (HappyAbsSyn ) happyIn4 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn4 #-} happyOut4 :: (HappyAbsSyn ) -> (ParseOutput) happyOut4 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut4 #-} happyIn5 :: ([RelInfo]) -> (HappyAbsSyn ) happyIn5 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn5 #-} happyOut5 :: (HappyAbsSyn ) -> ([RelInfo]) happyOut5 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut5 #-} happyIn6 :: (String) -> (HappyAbsSyn ) happyIn6 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn6 #-} happyOut6 :: (HappyAbsSyn ) -> (String) happyOut6 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut6 #-} happyIn7 :: ([Formula NomSymbol PropSymbol RelSymbol]) -> (HappyAbsSyn ) happyIn7 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn7 #-} happyOut7 :: (HappyAbsSyn ) -> ([Formula NomSymbol PropSymbol RelSymbol]) happyOut7 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut7 #-} happyIn8 :: ([InferenceTask]) -> (HappyAbsSyn ) happyIn8 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn8 #-} happyOut8 :: (HappyAbsSyn ) -> ([InferenceTask]) happyOut8 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut8 #-} happyIn9 :: (InferenceTask) -> (HappyAbsSyn ) happyIn9 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn9 #-} happyOut9 :: (HappyAbsSyn ) -> (InferenceTask) happyOut9 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut9 #-} happyIn10 :: (Maybe String) -> (HappyAbsSyn ) happyIn10 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn10 #-} happyOut10 :: (HappyAbsSyn ) -> (Maybe String) happyOut10 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut10 #-} happyIn11 :: ([ProverInfo]) -> (HappyAbsSyn ) happyIn11 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn11 #-} happyOut11 :: (HappyAbsSyn ) -> ([ProverInfo]) happyOut11 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut11 #-} happyIn12 :: ([ProverInfo]) -> (HappyAbsSyn ) happyIn12 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn12 #-} happyOut12 :: (HappyAbsSyn ) -> ([ProverInfo]) happyOut12 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut12 #-} happyIn13 :: ([(String,String)]) -> (HappyAbsSyn ) happyIn13 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn13 #-} happyOut13 :: (HappyAbsSyn ) -> ([(String,String)]) happyOut13 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut13 #-} happyIn14 :: (String) -> (HappyAbsSyn ) happyIn14 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn14 #-} happyOut14 :: (HappyAbsSyn ) -> (String) happyOut14 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut14 #-} happyIn15 :: ([RelInfo]) -> (HappyAbsSyn ) happyIn15 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn15 #-} happyOut15 :: (HappyAbsSyn ) -> ([RelInfo]) happyOut15 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut15 #-} happyIn16 :: ([RelInfo]) -> (HappyAbsSyn ) happyIn16 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn16 #-} happyOut16 :: (HappyAbsSyn ) -> ([RelInfo]) happyOut16 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut16 #-} happyIn17 :: ([RelInfo]) -> (HappyAbsSyn ) happyIn17 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn17 #-} happyOut17 :: (HappyAbsSyn ) -> ([RelInfo]) happyOut17 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut17 #-} happyIn18 :: ([RelProperty]) -> (HappyAbsSyn ) happyIn18 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn18 #-} happyOut18 :: (HappyAbsSyn ) -> ([RelProperty]) happyOut18 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut18 #-} happyIn19 :: (RelProperty) -> (HappyAbsSyn ) happyIn19 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn19 #-} happyOut19 :: (HappyAbsSyn ) -> (RelProperty) happyOut19 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut19 #-} happyIn20 :: (RelProperty) -> (HappyAbsSyn ) happyIn20 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn20 #-} happyOut20 :: (HappyAbsSyn ) -> (RelProperty) happyOut20 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut20 #-} happyIn21 :: ([String]) -> (HappyAbsSyn ) happyIn21 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn21 #-} happyOut21 :: (HappyAbsSyn ) -> ([String]) happyOut21 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut21 #-} happyIn22 :: ([Formula NomSymbol PropSymbol RelSymbol]) -> (HappyAbsSyn ) happyIn22 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn22 #-} happyOut22 :: (HappyAbsSyn ) -> ([Formula NomSymbol PropSymbol RelSymbol]) happyOut22 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut22 #-} happyIn23 :: (Formula NomSymbol PropSymbol RelSymbol) -> (HappyAbsSyn ) happyIn23 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn23 #-} happyOut23 :: (HappyAbsSyn ) -> (Formula NomSymbol PropSymbol RelSymbol) happyOut23 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut23 #-} happyIn24 :: (CountOp) -> (HappyAbsSyn ) happyIn24 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn24 #-} happyOut24 :: (HappyAbsSyn ) -> (CountOp) happyOut24 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut24 #-} happyIn25 :: (RelSymbol) -> (HappyAbsSyn ) happyIn25 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn25 #-} happyOut25 :: (HappyAbsSyn ) -> (RelSymbol) happyOut25 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut25 #-} happyIn26 :: (NomSymbol) -> (HappyAbsSyn ) happyIn26 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyIn26 #-} happyOut26 :: (HappyAbsSyn ) -> (NomSymbol) happyOut26 x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOut26 #-} happyInTok :: ((Token, FilePos)) -> (HappyAbsSyn ) happyInTok x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyInTok #-} happyOutTok :: (HappyAbsSyn ) -> ((Token, FilePos)) happyOutTok x = Happy_GHC_Exts.unsafeCoerce# x {-# INLINE happyOutTok #-} happyActOffsets :: HappyAddr happyActOffsets = HappyA# "\x3f\x01\x3f\x01\x17\x01\x16\x01\x48\x00\x14\x01\x00\x00\x00\x00\x13\x01\x12\x01\x11\x01\x00\x00\x4d\x00\x4d\x00\x4d\x00\x2a\x01\x29\x01\x0b\x01\x0e\x01\x09\x01\x00\x00\x00\x00\x00\x00\x08\x01\xf4\xff\x06\x01\x1f\x01\x05\x01\x4d\x00\x1f\x01\x1f\x01\x4d\x00\x28\x01\x1d\x01\x04\x01\xe6\xff\x00\x00\x1c\x01\x03\x01\xff\x00\x02\x01\x00\x00\x00\x00\x00\x00\x00\x00\x70\x00\x00\x00\xfe\x00\xfc\x00\xfb\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x4d\x00\xf8\xff\xf6\xff\x4d\x00\x4d\x00\x4d\x00\x00\x00\xa6\x00\x00\x00\xf8\x00\x33\x00\x15\x01\x0f\x01\x1b\x00\x0d\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x0a\x00\x0c\x01\x00\x00\x00\x00\xe6\xff\xe6\xff\xe6\xff\xe6\xff\xe6\xff\xe6\xff\xe6\xff\xe6\xff\x4b\x00\x4b\x00\xf7\x00\x00\x00\x00\x00\x00\x00\xf3\x00\x66\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xe6\xff\xf6\x00\x00\x00\x00\x00\xf4\x00\x49\x00\xe6\xff\x05\x00\xe6\xff\xe6\xff\xe6\xff\xe6\xff\xe6\xff\x00\x00\xf2\x00\xf2\x00\xf2\x00\xf2\x00\xf0\x00\x00\x00\x00\x00\x00\x00\x3c\x00\x00\x00\x3c\x00\x00\x00\x70\x00\x70\x00\xef\x00\x3c\x00\x00\x00\x00\x00\xee\x00\xec\x00\xeb\x00\xe0\x00\x07\x01\xdc\x00\xd8\x00\xd4\x00\x00\x00\x8d\x00\xd7\xff\xd7\x00\x00\x00\xce\x00\xe6\xff\x00\x00\xe6\xff\xe6\xff\xe6\xff\xe6\xff\x00\x00\x00\x00\xe6\xff\xe6\xff\x8d\x00\x8d\x00\x00\x00\x00\x00\x5a\x00\x56\x00\x8d\x00\xe6\xff\xc4\x00\xb4\x00\xac\x00\x00\x00\x9c\x00\x3c\x00\x00\x00\x00\x00\x00\x00\x9a\x00\xbf\x00\xe6\xff\xe6\xff\xe6\xff\xe6\xff\x8d\x00\x00\x00\x00\x00\xbb\x00\xb7\x00\xaf\x00\xa7\x00\xcb\x00\x34\x00\x00\x00\x99\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x3c\x00\x00\x00\x00\x00"# happyGotoOffsets :: HappyAddr happyGotoOffsets = HappyA# "\xca\x00\x00\x00\x00\x00\x00\x00\x30\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x8b\x00\x42\x00\x3d\x00\xc7\x00\xc3\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xb6\x00\x00\x00\x89\x00\xab\x00\x83\x00\x2d\x00\x86\x00\x50\x00\x00\x00\xa0\x00\x00\x00\x21\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x10\x01\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xb3\x00\xae\x00\xa9\x00\xa4\x00\x9f\x00\x95\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x73\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x01\x01\xfd\x00\xf9\x00\xf5\x00\xf1\x00\xed\x00\xe9\x00\xe5\x00\x59\x00\x58\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\xe1\x00\x00\x00\x00\x00\x00\x00\x00\x00\x53\x00\xdd\x00\x2e\x00\xd9\x00\xd5\x00\xd1\x00\xcd\x00\x9b\x00\x00\x00\x65\x00\x61\x00\x52\x00\x47\x00\x00\x00\x00\x00\x00\x00\x00\x00\x28\x00\x00\x00\x12\x00\x00\x00\x0d\x01\x0a\x01\x00\x00\x88\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\xc9\x00\x00\x00\xc5\x00\xc1\x00\xbd\x00\xb9\x00\x00\x00\x00\x00\xb5\x00\xb1\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xad\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x63\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x96\x00\x91\x00\x8c\x00\x87\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x32\x00\x1f\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x25\x00\x00\x00\x00\x00"# happyDefActions :: HappyAddr happyDefActions = HappyA# "\x00\x00\x00\x00\x00\x00\x00\x00\xe3\xff\x00\x00\xfd\xff\xfc\xff\x00\x00\x00\x00\x00\x00\xe4\xff\xdf\xff\xc7\xff\xc7\xff\xef\xff\x00\x00\x00\x00\xc6\xff\x00\x00\xfb\xff\xfa\xff\xf9\xff\x00\x00\xde\xff\x00\x00\xe3\xff\x00\x00\xdf\xff\xe3\xff\xe3\xff\xc7\xff\xed\xff\xf7\xff\x00\x00\xc4\xff\xfe\xff\xf7\xff\x00\x00\x00\x00\x00\x00\xc5\xff\xe2\xff\xe1\xff\xdd\xff\xda\xff\xe0\xff\x00\x00\xd9\xff\xd8\xff\xd3\xff\xd5\xff\xd4\xff\xd2\xff\xd1\xff\xd0\xff\xcf\xff\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xee\xff\x00\x00\xf6\xff\x00\x00\xc3\xff\x00\x00\x00\x00\x9c\xff\x00\x00\xa6\xff\xa5\xff\xa4\xff\xa3\xff\xa2\xff\xa1\xff\x9d\xff\xbf\xff\xc1\xff\xc0\xff\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x9e\xff\xa0\xff\x9f\xff\x00\x00\x00\x00\xba\xff\xbb\xff\xbc\xff\xb7\xff\xb8\xff\xb9\xff\xb2\xff\x00\x00\x00\x00\x9c\xff\x9d\xff\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xc4\xff\xf8\xff\xf1\xff\xf1\xff\xf1\xff\xf1\xff\x00\x00\xc8\xff\xc9\xff\xcc\xff\xc7\xff\xce\xff\xc7\xff\xca\xff\xda\xff\xda\xff\xdc\xff\xdf\xff\xd7\xff\xd6\xff\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\x00\xc2\xff\xb3\xff\xb4\xff\xb0\xff\xb1\xff\x00\x00\x00\x00\xae\xff\x00\x00\x00\x00\x00\x00\x00\x00\xaf\xff\xa7\xff\x00\x00\x00\x00\xb5\xff\xb6\xff\xaa\xff\xab\xff\x00\x00\x00\x00\xa9\xff\x00\x00\x00\x00\x00\x00\x00\x00\xf0\xff\x00\x00\xeb\xff\xcb\xff\xcd\xff\xdb\xff\x00\x00\x00\x00\xc4\xff\xc4\xff\xc4\xff\xc4\xff\xa8\xff\xac\xff\xad\xff\x00\x00\x00\x00\x00\x00\x00\x00\xed\xff\x00\x00\xe8\xff\xea\xff\xe7\xff\xe6\xff\xe5\xff\xec\xff\xf2\xff\xf3\xff\xf4\xff\xf5\xff\xeb\xff\xe9\xff"# happyCheck :: HappyAddr happyCheck = HappyA# 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happyTable :: HappyAddr happyTable = HappyA# 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happyReduceArr = Happy_Data_Array.array (1, 99) [ (1 , happyReduce_1), (2 , happyReduce_2), (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) ] happy_n_terms = 66 :: Int happy_n_nonterms = 23 :: Int happyReduce_1 = happyReduce 7# 0# happyReduction_1 happyReduction_1 (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 happyOut5 happy_x_3 of { happy_var_3 -> case happyOut11 happy_x_5 of { happy_var_5 -> case happyOut7 happy_x_6 of { happy_var_6 -> case happyOut8 happy_x_7 of { happy_var_7 -> happyIn4 (PO{relations = happy_var_3, provers = happy_var_5, theory = happy_var_6, tasks = happy_var_7} ) `HappyStk` happyRest}}}} happyReduce_2 = happySpecReduce_1 1# happyReduction_2 happyReduction_2 happy_x_1 = case happyOut15 happy_x_1 of { happy_var_1 -> happyIn5 (happy_var_1 )} happyReduce_3 = happySpecReduce_1 1# happyReduction_3 happyReduction_3 happy_x_1 = case happyOut16 happy_x_1 of { happy_var_1 -> happyIn5 (happy_var_1 )} happyReduce_4 = happySpecReduce_1 2# happyReduction_4 happyReduction_4 happy_x_1 = case happyOutTok happy_x_1 of { ((TokenVariable happy_var_1, _)) -> happyIn6 (happy_var_1 )} happyReduce_5 = happySpecReduce_1 2# happyReduction_5 happyReduction_5 happy_x_1 = case happyOutTok happy_x_1 of { ((TokenProp happy_var_1 , _)) -> happyIn6 (let PropSymbol x = happy_var_1 in x )} happyReduce_6 = happySpecReduce_1 2# happyReduction_6 happyReduction_6 happy_x_1 = case happyOutTok happy_x_1 of { ((TokenNom happy_var_1 , _)) -> happyIn6 (let NomSymbol x = happy_var_1 in x )} happyReduce_7 = happyReduce 4# 3# happyReduction_7 happyReduction_7 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut22 happy_x_3 of { happy_var_3 -> happyIn7 (happy_var_3 ) `HappyStk` happyRest} happyReduce_8 = happySpecReduce_0 4# happyReduction_8 happyReduction_8 = happyIn8 ([] ) happyReduce_9 = happySpecReduce_2 4# happyReduction_9 happyReduction_9 happy_x_2 happy_x_1 = case happyOut9 happy_x_1 of { happy_var_1 -> case happyOut8 happy_x_2 of { happy_var_2 -> happyIn8 (happy_var_1:happy_var_2 )}} happyReduce_10 = happyReduce 8# 5# happyReduction_10 happyReduction_10 (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 happyOut10 happy_x_4 of { happy_var_4 -> case happyOut22 happy_x_7 of { happy_var_7 -> happyIn9 ((Valid, happy_var_4, happy_var_7) ) `HappyStk` happyRest}} happyReduce_11 = happyReduce 8# 5# happyReduction_11 happyReduction_11 (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 happyOut10 happy_x_4 of { happy_var_4 -> case happyOut22 happy_x_7 of { happy_var_7 -> happyIn9 ((Satisfiable, happy_var_4, happy_var_7) ) `HappyStk` happyRest}} happyReduce_12 = happyReduce 8# 5# happyReduction_12 happyReduction_12 (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 happyOut10 happy_x_4 of { happy_var_4 -> case happyOut22 happy_x_7 of { happy_var_7 -> happyIn9 ((Retrieve, happy_var_4, happy_var_7) ) `HappyStk` happyRest}} happyReduce_13 = happyReduce 8# 5# happyReduction_13 happyReduction_13 (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 happyOut10 happy_x_4 of { happy_var_4 -> case happyOut22 happy_x_7 of { happy_var_7 -> happyIn9 ((Counting, happy_var_4, happy_var_7) ) `HappyStk` happyRest}} happyReduce_14 = happySpecReduce_0 6# happyReduction_14 happyReduction_14 = happyIn10 (Nothing ) happyReduce_15 = happySpecReduce_2 6# happyReduction_15 happyReduction_15 happy_x_2 happy_x_1 = case happyOutTok happy_x_2 of { ((TokenFile happy_var_2, _)) -> happyIn10 (Just happy_var_2 )} happyReduce_16 = happySpecReduce_0 7# happyReduction_16 happyReduction_16 = happyIn11 ([] ) happyReduce_17 = happyReduce 4# 7# happyReduction_17 happyReduction_17 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut12 happy_x_3 of { happy_var_3 -> happyIn11 (happy_var_3 ) `HappyStk` happyRest} happyReduce_18 = happySpecReduce_0 8# happyReduction_18 happyReduction_18 = happyIn12 ([] ) happyReduce_19 = happyReduce 8# 8# happyReduction_19 happyReduction_19 (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 happyOut6 happy_x_3 of { happy_var_3 -> case happyOut13 happy_x_6 of { happy_var_6 -> case happyOut12 happy_x_8 of { happy_var_8 -> happyIn12 ((happy_var_3,happy_var_6):happy_var_8 ) `HappyStk` happyRest}}} happyReduce_20 = happySpecReduce_0 9# happyReduction_20 happyReduction_20 = happyIn13 ([] ) happyReduce_21 = happySpecReduce_3 9# happyReduction_21 happyReduction_21 happy_x_3 happy_x_2 happy_x_1 = case happyOut6 happy_x_1 of { happy_var_1 -> case happyOut14 happy_x_3 of { happy_var_3 -> happyIn13 ([(happy_var_1,happy_var_3)] )}} happyReduce_22 = happyReduce 5# 9# happyReduction_22 happyReduction_22 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut6 happy_x_1 of { happy_var_1 -> case happyOut14 happy_x_3 of { happy_var_3 -> case happyOut13 happy_x_5 of { happy_var_5 -> happyIn13 ((happy_var_1,happy_var_3): happy_var_5 ) `HappyStk` happyRest}}} happyReduce_23 = happySpecReduce_1 10# happyReduction_23 happyReduction_23 happy_x_1 = case happyOut6 happy_x_1 of { happy_var_1 -> happyIn14 (happy_var_1 )} happyReduce_24 = happySpecReduce_1 10# happyReduction_24 happyReduction_24 happy_x_1 = case happyOutTok happy_x_1 of { ((TokenLabel happy_var_1, _)) -> happyIn14 (happy_var_1 )} happyReduce_25 = happySpecReduce_1 10# happyReduction_25 happyReduction_25 happy_x_1 = happyIn14 ("true" ) happyReduce_26 = happySpecReduce_1 10# happyReduction_26 happyReduction_26 happy_x_1 = happyIn14 ("false" ) happyReduce_27 = happyMonadReduce 1# 11# happyReduction_27 happyReduction_27 (happy_x_1 `HappyStk` happyRest) tk = happyThen (( putType Automatic >>= \s -> return []) ) (\r -> happyReturn (happyIn15 r)) happyReduce_28 = happyMonadReduce 0# 12# happyReduction_28 happyReduction_28 (happyRest) tk = happyThen (( putType NotAutomatic >>= \s -> return []) ) (\r -> happyReturn (happyIn16 r)) happyReduce_29 = happyMonadReduce 5# 12# happyReduction_29 happyReduction_29 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOut21 happy_x_3 of { happy_var_3 -> case happyOut16 happy_x_5 of { happy_var_5 -> ( getSig >>= \s -> putSig (foldr addPToSig s happy_var_3) >>= \s -> putType NotAutomatic >>= \s -> return happy_var_5)}} ) (\r -> happyReturn (happyIn16 r)) happyReduce_30 = happyMonadReduce 5# 12# happyReduction_30 happyReduction_30 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOut21 happy_x_3 of { happy_var_3 -> case happyOut16 happy_x_5 of { happy_var_5 -> ( getSig >>= \s -> putSig (foldr addNToSig s happy_var_3) >>= \s -> putType NotAutomatic >>= \s -> return happy_var_5)}} ) (\r -> happyReturn (happyIn16 r)) happyReduce_31 = happyMonadReduce 5# 12# happyReduction_31 happyReduction_31 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOut17 happy_x_3 of { happy_var_3 -> case happyOut16 happy_x_5 of { happy_var_5 -> ( getSig >>= \s -> putSig (foldr (addRToSig . fst) s happy_var_3) >>= \s -> putType NotAutomatic >>= \s -> return (happy_var_3++happy_var_5))}} ) (\r -> happyReturn (happyIn16 r)) happyReduce_32 = happySpecReduce_0 13# happyReduction_32 happyReduction_32 = happyIn17 ([] ) happyReduce_33 = happySpecReduce_1 13# happyReduction_33 happyReduction_33 happy_x_1 = case happyOut6 happy_x_1 of { happy_var_1 -> happyIn17 ([(happy_var_1, [])] )} happyReduce_34 = happySpecReduce_3 13# happyReduction_34 happyReduction_34 happy_x_3 happy_x_2 happy_x_1 = case happyOut6 happy_x_1 of { happy_var_1 -> case happyOut17 happy_x_3 of { happy_var_3 -> happyIn17 ((happy_var_1, []):happy_var_3 )}} happyReduce_35 = happyReduce 5# 13# happyReduction_35 happyReduction_35 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut6 happy_x_1 of { happy_var_1 -> case happyOut18 happy_x_4 of { happy_var_4 -> happyIn17 ([(happy_var_1, happy_var_4)] ) `HappyStk` happyRest}} happyReduce_36 = happyReduce 7# 13# happyReduction_36 happyReduction_36 (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 happyOut6 happy_x_1 of { happy_var_1 -> case happyOut18 happy_x_4 of { happy_var_4 -> case happyOut17 happy_x_7 of { happy_var_7 -> happyIn17 ((happy_var_1 , happy_var_4):happy_var_7 ) `HappyStk` happyRest}}} happyReduce_37 = happySpecReduce_0 14# happyReduction_37 happyReduction_37 = happyIn18 ([] ) happyReduce_38 = happySpecReduce_1 14# happyReduction_38 happyReduction_38 happy_x_1 = case happyOut19 happy_x_1 of { happy_var_1 -> happyIn18 ([happy_var_1] )} happyReduce_39 = happySpecReduce_1 14# happyReduction_39 happyReduction_39 happy_x_1 = case happyOut20 happy_x_1 of { happy_var_1 -> happyIn18 ([happy_var_1] )} happyReduce_40 = happySpecReduce_3 14# happyReduction_40 happyReduction_40 happy_x_3 happy_x_2 happy_x_1 = case happyOut19 happy_x_1 of { happy_var_1 -> case happyOut18 happy_x_3 of { happy_var_3 -> happyIn18 (happy_var_1:happy_var_3 )}} happyReduce_41 = happySpecReduce_3 14# happyReduction_41 happyReduction_41 happy_x_3 happy_x_2 happy_x_1 = case happyOut20 happy_x_1 of { happy_var_1 -> case happyOut18 happy_x_3 of { happy_var_3 -> happyIn18 (happy_var_1:happy_var_3 )}} happyReduce_42 = happySpecReduce_1 15# happyReduction_42 happyReduction_42 happy_x_1 = happyIn19 (Universal ) happyReduce_43 = happySpecReduce_1 15# happyReduction_43 happyReduction_43 happy_x_1 = happyIn19 (Difference ) happyReduce_44 = happySpecReduce_1 15# happyReduction_44 happyReduction_44 happy_x_1 = happyIn19 (Reflexive ) happyReduce_45 = happySpecReduce_1 15# happyReduction_45 happyReduction_45 happy_x_1 = happyIn19 (Transitive ) happyReduce_46 = happySpecReduce_1 15# happyReduction_46 happyReduction_46 happy_x_1 = happyIn19 (Symmetric ) happyReduce_47 = happySpecReduce_1 15# happyReduction_47 happyReduction_47 happy_x_1 = happyIn19 (Functional ) happyReduce_48 = happySpecReduce_1 15# happyReduction_48 happyReduction_48 happy_x_1 = happyIn19 (Injective ) happyReduce_49 = happySpecReduce_2 16# happyReduction_49 happyReduction_49 happy_x_2 happy_x_1 = case happyOut6 happy_x_2 of { happy_var_2 -> happyIn20 (SubsetOf [happy_var_2] )} happyReduce_50 = happyReduce 4# 16# happyReduction_50 happyReduction_50 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut21 happy_x_3 of { happy_var_3 -> happyIn20 (SubsetOf happy_var_3 ) `HappyStk` happyRest} happyReduce_51 = happySpecReduce_2 16# happyReduction_51 happyReduction_51 happy_x_2 happy_x_1 = case happyOut6 happy_x_2 of { happy_var_2 -> happyIn20 (Equals [happy_var_2] )} happyReduce_52 = happyReduce 4# 16# happyReduction_52 happyReduction_52 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut21 happy_x_3 of { happy_var_3 -> happyIn20 (Equals happy_var_3 ) `HappyStk` happyRest} happyReduce_53 = happySpecReduce_2 16# happyReduction_53 happyReduction_53 happy_x_2 happy_x_1 = case happyOut6 happy_x_2 of { happy_var_2 -> happyIn20 (InverseOf happy_var_2 )} happyReduce_54 = happySpecReduce_2 16# happyReduction_54 happyReduction_54 happy_x_2 happy_x_1 = case happyOut6 happy_x_2 of { happy_var_2 -> happyIn20 (TClosureOf happy_var_2 )} happyReduce_55 = happySpecReduce_2 16# happyReduction_55 happyReduction_55 happy_x_2 happy_x_1 = case happyOut6 happy_x_2 of { happy_var_2 -> happyIn20 (TRClosureOf happy_var_2 )} happyReduce_56 = happySpecReduce_0 17# happyReduction_56 happyReduction_56 = happyIn21 ([] ) happyReduce_57 = happySpecReduce_1 17# happyReduction_57 happyReduction_57 happy_x_1 = case happyOut6 happy_x_1 of { happy_var_1 -> happyIn21 ([happy_var_1] )} happyReduce_58 = happySpecReduce_3 17# happyReduction_58 happyReduction_58 happy_x_3 happy_x_2 happy_x_1 = case happyOut6 happy_x_1 of { happy_var_1 -> case happyOut21 happy_x_3 of { happy_var_3 -> happyIn21 (happy_var_1:happy_var_3 )}} happyReduce_59 = happySpecReduce_0 18# happyReduction_59 happyReduction_59 = happyIn22 ([] ) happyReduce_60 = happySpecReduce_1 18# happyReduction_60 happyReduction_60 happy_x_1 = case happyOut23 happy_x_1 of { happy_var_1 -> happyIn22 ([happy_var_1] )} happyReduce_61 = happySpecReduce_3 18# happyReduction_61 happyReduction_61 happy_x_3 happy_x_2 happy_x_1 = case happyOut23 happy_x_1 of { happy_var_1 -> case happyOut22 happy_x_3 of { happy_var_3 -> happyIn22 (happy_var_1:happy_var_3 )}} happyReduce_62 = happySpecReduce_1 19# happyReduction_62 happyReduction_62 happy_x_1 = happyIn23 (Top ) happyReduce_63 = happySpecReduce_1 19# happyReduction_63 happyReduction_63 happy_x_1 = happyIn23 (Bot ) happyReduce_64 = happyMonadReduce 1# 19# happyReduction_64 happyReduction_64 (happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOutTok happy_x_1 of { ((TokenNom happy_var_1 , _)) -> ( get >>= \s -> if (isAutomatic s) then return (Nom happy_var_1) else if (isNomInSig happy_var_1 (pSig s)) then return (Nom happy_var_1) else (error $ (show happy_var_1) ++ " not in Sig as Nominal"))} ) (\r -> happyReturn (happyIn23 r)) happyReduce_65 = happyMonadReduce 1# 19# happyReduction_65 happyReduction_65 (happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOutTok happy_x_1 of { ((TokenProp happy_var_1 , _)) -> ( get >>= \s -> if (isAutomatic s) then return (Prop happy_var_1) else if (isPropInSig happy_var_1 (pSig s)) then return (Prop happy_var_1) else (error $ (show happy_var_1) ++ " not in Sig as Prop"))} ) (\r -> happyReturn (happyIn23 r)) happyReduce_66 = happyMonadReduce 1# 19# happyReduction_66 happyReduction_66 (happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOutTok happy_x_1 of { ((TokenVariable happy_var_1, _)) -> ( getSig >>= \s -> if (isNomInSig (NomSymbol happy_var_1) s) then return (Nom (NomSymbol happy_var_1)) else if (isPropInSig (PropSymbol happy_var_1) s) then return (Prop (PropSymbol happy_var_1)) else if (isRelInSig (RelSymbol happy_var_1) s) then error (happy_var_1 ++ " defined as Rel") else (error $ "Symbol not in Sig : " ++ happy_var_1))} ) (\r -> happyReturn (happyIn23 r)) happyReduce_67 = happySpecReduce_2 19# happyReduction_67 happyReduction_67 happy_x_2 happy_x_1 = case happyOutTok happy_x_1 of { ((TokenDia happy_var_1 , _)) -> case happyOut23 happy_x_2 of { happy_var_2 -> happyIn23 (Diam happy_var_1 happy_var_2 )}} happyReduce_68 = happySpecReduce_2 19# happyReduction_68 happyReduction_68 happy_x_2 happy_x_1 = case happyOut23 happy_x_2 of { happy_var_2 -> happyIn23 (E happy_var_2 )} happyReduce_69 = happySpecReduce_2 19# happyReduction_69 happyReduction_69 happy_x_2 happy_x_1 = case happyOut23 happy_x_2 of { happy_var_2 -> happyIn23 (D happy_var_2 )} happyReduce_70 = happySpecReduce_2 19# happyReduction_70 happyReduction_70 happy_x_2 happy_x_1 = case happyOutTok happy_x_1 of { ((TokenBox happy_var_1 , _)) -> case happyOut23 happy_x_2 of { happy_var_2 -> happyIn23 (Box happy_var_1 happy_var_2 )}} happyReduce_71 = happySpecReduce_2 19# happyReduction_71 happyReduction_71 happy_x_2 happy_x_1 = case happyOut23 happy_x_2 of { happy_var_2 -> happyIn23 (A happy_var_2 )} happyReduce_72 = happySpecReduce_2 19# happyReduction_72 happyReduction_72 happy_x_2 happy_x_1 = case happyOut23 happy_x_2 of { happy_var_2 -> happyIn23 (B happy_var_2 )} happyReduce_73 = happyMonadReduce 4# 19# happyReduction_73 happyReduction_73 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOut25 happy_x_2 of { happy_var_2 -> case happyOut23 happy_x_4 of { happy_var_4 -> ( getSig >>= \s -> if (isRelInSig happy_var_2 s) then return (Diam happy_var_2 happy_var_4) else (error $ (show happy_var_2) ++ " not in Sig as Relation"))}} ) (\r -> happyReturn (happyIn23 r)) happyReduce_74 = happyMonadReduce 4# 19# happyReduction_74 happyReduction_74 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOut25 happy_x_2 of { happy_var_2 -> case happyOut23 happy_x_4 of { happy_var_4 -> ( getSig >>= \s -> if (isRelInSig happy_var_2 s) then return (Box happy_var_2 happy_var_4) else (error $ (show happy_var_2) ++ " not in Sig as Relation"))}} ) (\r -> happyReturn (happyIn23 r)) happyReduce_75 = happySpecReduce_3 19# happyReduction_75 happyReduction_75 happy_x_3 happy_x_2 happy_x_1 = case happyOut23 happy_x_1 of { happy_var_1 -> case happyOut23 happy_x_3 of { happy_var_3 -> happyIn23 (happy_var_1 :<-->: happy_var_3 )}} happyReduce_76 = happySpecReduce_3 19# happyReduction_76 happyReduction_76 happy_x_3 happy_x_2 happy_x_1 = case happyOut23 happy_x_1 of { happy_var_1 -> case happyOut23 happy_x_3 of { happy_var_3 -> happyIn23 (happy_var_1 :-->: happy_var_3 )}} happyReduce_77 = happySpecReduce_2 19# happyReduction_77 happyReduction_77 happy_x_2 happy_x_1 = case happyOut23 happy_x_2 of { happy_var_2 -> happyIn23 (Neg happy_var_2 )} happyReduce_78 = happySpecReduce_3 19# happyReduction_78 happyReduction_78 happy_x_3 happy_x_2 happy_x_1 = case happyOut23 happy_x_1 of { happy_var_1 -> case happyOut23 happy_x_3 of { happy_var_3 -> happyIn23 (happy_var_1 :&: happy_var_3 )}} happyReduce_79 = happySpecReduce_3 19# happyReduction_79 happyReduction_79 happy_x_3 happy_x_2 happy_x_1 = case happyOut23 happy_x_1 of { happy_var_1 -> case happyOut23 happy_x_3 of { happy_var_3 -> happyIn23 (happy_var_1 :|: happy_var_3 )}} happyReduce_80 = happyMonadReduce 3# 19# happyReduction_80 happyReduction_80 (happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOutTok happy_x_1 of { ((TokenNom happy_var_1 , _)) -> case happyOut23 happy_x_3 of { happy_var_3 -> ( get >>= \s -> if (isAutomatic s) then return (At happy_var_1 happy_var_3) else if (isNomInSig happy_var_1 (pSig s)) then return (At happy_var_1 happy_var_3) else (error $ (show happy_var_1) ++ " not defined as Nom in Sig"))}} ) (\r -> happyReturn (happyIn23 r)) happyReduce_81 = happyMonadReduce 3# 19# happyReduction_81 happyReduction_81 (happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOut26 happy_x_1 of { happy_var_1 -> case happyOut23 happy_x_3 of { happy_var_3 -> ( getSig >>= \s -> if (isNomInSig happy_var_1 s) then return (At happy_var_1 happy_var_3) else (error $ (show happy_var_1) ++ " not defined as Nom in Sig"))}} ) (\r -> happyReturn (happyIn23 r)) happyReduce_82 = happyMonadReduce 5# 19# happyReduction_82 happyReduction_82 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOutTok happy_x_3 of { ((TokenNom happy_var_3 , _)) -> case happyOut23 happy_x_4 of { happy_var_4 -> ( get >>= \s -> if (isAutomatic s) then return (Formula.Down happy_var_3 happy_var_4) else if (isNomInSig happy_var_3 (pSig s)) then return (Formula.Down happy_var_3 happy_var_4) else (error $ (show happy_var_3) ++ " not defined as Nom in Sig"))}} ) (\r -> happyReturn (happyIn23 r)) happyReduce_83 = happyMonadReduce 5# 19# happyReduction_83 happyReduction_83 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOut26 happy_x_3 of { happy_var_3 -> case happyOut23 happy_x_4 of { happy_var_4 -> ( getSig >>= \s -> if (isNomInSig happy_var_3 s) then return (Formula.Down happy_var_3 happy_var_4) else (error $ (show happy_var_3) ++ " not defined as Nom in Sig"))}} ) (\r -> happyReturn (happyIn23 r)) happyReduce_84 = happyMonadReduce 4# 19# happyReduction_84 happyReduction_84 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOutTok happy_x_2 of { ((TokenNom happy_var_2 , _)) -> case happyOut23 happy_x_4 of { happy_var_4 -> ( get >>= \s -> if (isAutomatic s) then return (Formula.Down happy_var_2 happy_var_4) else if (isNomInSig happy_var_2 (pSig s)) then return (Formula.Down happy_var_2 happy_var_4) else (error $ (show happy_var_2) ++ " not defined as Nom in Sig"))}} ) (\r -> happyReturn (happyIn23 r)) happyReduce_85 = happyMonadReduce 4# 19# happyReduction_85 happyReduction_85 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOut26 happy_x_2 of { happy_var_2 -> case happyOut23 happy_x_4 of { happy_var_4 -> ( getSig >>= \s -> if (isNomInSig happy_var_2 s) then return (Formula.Down happy_var_2 happy_var_4) else (error $ (show happy_var_2) ++ " not defined as Nom in Sig"))}} ) (\r -> happyReturn (happyIn23 r)) happyReduce_86 = happyReduce 4# 19# happyReduction_86 happyReduction_86 (happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) = case happyOut24 happy_x_1 of { happy_var_1 -> case happyOutTok happy_x_2 of { ((TokenInteger happy_var_2, _)) -> case happyOut23 happy_x_4 of { happy_var_4 -> happyIn23 (Count happy_var_1 Global happy_var_2 happy_var_4 ) `HappyStk` happyRest}}} happyReduce_87 = happyMonadReduce 5# 19# happyReduction_87 happyReduction_87 (happy_x_5 `HappyStk` happy_x_4 `HappyStk` happy_x_3 `HappyStk` happy_x_2 `HappyStk` happy_x_1 `HappyStk` happyRest) tk = happyThen (case happyOut24 happy_x_1 of { happy_var_1 -> case happyOutTok happy_x_2 of { ((TokenInteger happy_var_2, _)) -> case happyOut25 happy_x_3 of { happy_var_3 -> case happyOut23 happy_x_5 of { happy_var_5 -> ( getSig >>= \s -> if (isRelInSig happy_var_3 s) then return (Count happy_var_1 (Local happy_var_3) happy_var_2 happy_var_5) else (error $ (show happy_var_3) ++ " not in Sig as Relation"))}}}} ) (\r -> happyReturn (happyIn23 r)) happyReduce_88 = happySpecReduce_3 19# happyReduction_88 happyReduction_88 happy_x_3 happy_x_2 happy_x_1 = case happyOut23 happy_x_2 of { happy_var_2 -> happyIn23 (happy_var_2 )} happyReduce_89 = happySpecReduce_1 20# happyReduction_89 happyReduction_89 happy_x_1 = happyIn24 (:>=: ) happyReduce_90 = happySpecReduce_1 20# happyReduction_90 happyReduction_90 happy_x_1 = happyIn24 (:<=: ) happyReduce_91 = happySpecReduce_1 20# happyReduction_91 happyReduction_91 happy_x_1 = happyIn24 (:>: ) happyReduce_92 = happySpecReduce_1 20# happyReduction_92 happyReduction_92 happy_x_1 = happyIn24 (:<: ) happyReduce_93 = happySpecReduce_1 20# happyReduction_93 happyReduction_93 happy_x_1 = happyIn24 (:=: ) happyReduce_94 = happySpecReduce_1 20# happyReduction_94 happyReduction_94 happy_x_1 = happyIn24 (:/=: ) happyReduce_95 = happySpecReduce_1 21# happyReduction_95 happyReduction_95 happy_x_1 = case happyOutTok happy_x_1 of { ((TokenProp happy_var_1 , _)) -> happyIn25 (let (PropSymbol l) = happy_var_1 in RelSymbol l )} happyReduce_96 = happySpecReduce_1 21# happyReduction_96 happyReduction_96 happy_x_1 = case happyOutTok happy_x_1 of { ((TokenNom happy_var_1 , _)) -> happyIn25 (let (NomSymbol l) = happy_var_1 in RelSymbol l )} happyReduce_97 = happySpecReduce_1 21# happyReduction_97 happyReduction_97 happy_x_1 = case happyOutTok happy_x_1 of { ((TokenVariable happy_var_1, _)) -> happyIn25 (RelSymbol happy_var_1 )} happyReduce_98 = happySpecReduce_1 22# happyReduction_98 happyReduction_98 happy_x_1 = case happyOutTok happy_x_1 of { ((TokenProp happy_var_1 , _)) -> happyIn26 (let (PropSymbol l) = happy_var_1 in NomSymbol l )} happyReduce_99 = happySpecReduce_1 22# happyReduction_99 happyReduction_99 happy_x_1 = case happyOutTok happy_x_1 of { ((TokenVariable happy_var_1, _)) -> happyIn26 (NomSymbol happy_var_1 )} happyNewToken action sts stk [] = happyDoAction 65# notHappyAtAll action sts stk [] happyNewToken action sts stk (tk:tks) = let cont i = happyDoAction i tk action sts stk tks in case tk of { (TokenSignature, _) -> cont 1#; (TokenPropositions, _) -> cont 2#; (TokenNominals , _) -> cont 3#; (TokenRelations, _) -> cont 4#; (TokenReflexive, _) -> cont 5#; (TokenUniversal, _) -> cont 6#; (TokenDifference, _) -> cont 7#; (TokenTransitive, _) -> cont 8#; (TokenSymmetric, _) -> cont 9#; (TokenFunctional, _) -> cont 10#; (TokenInjective, _) -> cont 11#; (TokenInverseOf, _) -> cont 12#; (TokenSubsetOf, _) -> cont 13#; (TokenEquals, _) -> cont 14#; (TokenTClosureOf ,_) -> cont 15#; (TokenTRClosureOf, _) -> cont 16#; (TokenAutomatic, _) -> cont 17#; (TokenProverParameters, _) -> cont 18#; (TokenProver, _) -> cont 19#; (TokenTheory, _) -> cont 20#; (TokenQuery, _) -> cont 21#; (TokenValid, _) -> cont 22#; (TokenSatisfiable, _) -> cont 23#; (TokenRetrieve, _) -> cont 24#; (TokenCount, _) -> cont 25#; (TokenInteger happy_dollar_dollar, _) -> cont 26#; (TokenVariable happy_dollar_dollar, _) -> cont 27#; (TokenLabel happy_dollar_dollar, _) -> cont 28#; (TokenFile happy_dollar_dollar, _) -> cont 29#; (TokenColon , _) -> cont 30#; (TokenDown , _) -> cont 31#; (TokenGE , _) -> cont 32#; (TokenLE , _) -> cont 33#; (TokenG , _) -> cont 34#; (TokenL , _) -> cont 35#; (TokenE , _) -> cont 36#; (TokenNE , _) -> cont 37#; (TokenProp happy_dollar_dollar , _) -> cont 38#; (TokenNom happy_dollar_dollar , _) -> cont 39#; (TokenTrue , _) -> cont 40#; (TokenFalse , _) -> cont 41#; (TokenNeg , _) -> cont 42#; (TokenAnd , _) -> cont 43#; (TokenOr , _) -> cont 44#; (TokenDimp , _) -> cont 45#; (TokenImp , _) -> cont 46#; (TokenBox happy_dollar_dollar , _) -> cont 47#; (TokenUBox , _) -> cont 48#; (TokenDBox , _) -> cont 49#; (TokenDia happy_dollar_dollar , _) -> cont 50#; (TokenUDia , _) -> cont 51#; (TokenDDia , _) -> cont 52#; (TokenOB , _) -> cont 53#; (TokenCB , _) -> cont 54#; (TokenSC , _) -> cont 55#; (TokenDot , _) -> cont 56#; (TokenComma , _) -> cont 57#; (TokenOC , _) -> cont 58#; (TokenCC , _) -> cont 59#; (TokenODia , _) -> cont 60#; (TokenCDia , _) -> cont 61#; (TokenOBox , _) -> cont 62#; (TokenCBox , _) -> cont 63#; (TokenEqual , _) -> cont 64#; _ -> happyError' (tk:tks) } happyError_ 65# tk tks = happyError' tks happyError_ _ tk tks = happyError' (tk:tks) happyThen :: () => State ParseState a -> (a -> State ParseState b) -> State ParseState b happyThen = (>>=) happyReturn :: () => a -> State ParseState a happyReturn = (return) happyThen1 m k tks = (>>=) m (\a -> k a tks) happyReturn1 :: () => a -> b -> State ParseState a happyReturn1 = \a tks -> (return) a happyError' :: () => [((Token, FilePos))] -> State ParseState a happyError' = happyError parse tks = happySomeParser where happySomeParser = happyThen (happyParse 0# tks) (\x -> happyReturn (happyOut4 x)) happySeq = happyDontSeq data ParseOutput = PO{relations :: [RelInfo], provers :: [ProverInfo], theory :: [Formula NomSymbol PropSymbol RelSymbol], tasks :: [InferenceTask] } deriving (Show) type RelInfo = (String,[RelProperty]) type ProverInfo = (String, [(String,String)]) type InferenceTask = (QueryType, Maybe String, [Formula NomSymbol PropSymbol RelSymbol]) data RelProperty = Reflexive | Symmetric | Transitive | Functional | Injective | Universal | Difference | -- InverseOf String | SubsetOf [String] | Equals [String] | TClosureOf String | TRClosureOf String deriving (Eq, Show, Ord) data QueryType = Valid | Satisfiable | Retrieve | Counting deriving (Eq, Show) data SignatureType = NotAutomatic | Automatic | NotSet deriving (Eq) type ParseState = (StringSignature,SignatureType) initParseState = (emptySignature, NotSet) pSig = fst pType = snd isAutomatic s = (pType s) == Automatic getSig :: State ParseState (StringSignature) getSig = do state <- get return (fst state) putSig :: StringSignature -> State ParseState () putSig s = do state <- get put (s,snd state) getType :: State ParseState (SignatureType) getType = do state <- get return (snd state) putType :: SignatureType -> State ParseState () putType t = do state <- get put (fst state, t) addPToSig l s = if (isNomInSig (NomSymbol l) s) then error $ l ++ " already declared as Nom" else if (isRelInSig (RelSymbol l) s) then error $ l ++ " already declared as Rel" else addPropToSig (PropSymbol l) s addNToSig l s = if (isPropInSig (PropSymbol l) s) then error $ l ++ " already declared as Prop" else if (isRelInSig (RelSymbol l) s) then error $ l ++ " already declared as Rel" else addNomToSig (NomSymbol l) s addRToSig l s = if (isPropInSig (PropSymbol l) s) then error $ l ++ " already declared as Prop" else if (isNomInSig (NomSymbol l) s) then error $ l ++ " already declared as Nom" else addRelToSig (RelSymbol l) s happyError :: [(Token, FilePos)] -> a happyError ((_, fp):_) = error ("Parse error near line " ++ (show $ line fp) ++ ", col. " ++ (show $ col fp)) {-# LINE 1 "templates/GenericTemplate.hs" #-} {-# LINE 1 "templates/GenericTemplate.hs" #-} {-# LINE 1 "" #-} {-# LINE 1 "" #-} {-# LINE 11 "" #-} # 1 "/usr/include/stdc-predef.h" 1 3 4 # 17 "/usr/include/stdc-predef.h" 3 4 {-# LINE 11 "" #-} {-# LINE 1 "/usr/lib/ghc/include/ghcversion.h" #-} {-# LINE 11 "" #-} {-# LINE 1 "templates/GenericTemplate.hs" #-} -- Id: GenericTemplate.hs,v 1.26 2005/01/14 14:47:22 simonmar Exp {-# LINE 13 "templates/GenericTemplate.hs" #-} -- Do not remove this comment. Required to fix CPP parsing when using GCC and a clang-compiled alex. #if __GLASGOW_HASKELL__ > 706 #define LT(n,m) ((Happy_GHC_Exts.tagToEnum# (n Happy_GHC_Exts.<# m)) :: Bool) #define GTE(n,m) ((Happy_GHC_Exts.tagToEnum# (n Happy_GHC_Exts.>=# m)) :: Bool) #define EQ(n,m) ((Happy_GHC_Exts.tagToEnum# (n Happy_GHC_Exts.==# m)) :: Bool) #else #define LT(n,m) (n Happy_GHC_Exts.<# m) #define GTE(n,m) (n Happy_GHC_Exts.>=# m) #define EQ(n,m) (n Happy_GHC_Exts.==# m) #endif {-# LINE 46 "templates/GenericTemplate.hs" #-} data Happy_IntList = HappyCons Happy_GHC_Exts.Int# Happy_IntList {-# LINE 67 "templates/GenericTemplate.hs" #-} {-# LINE 77 "templates/GenericTemplate.hs" #-} {-# LINE 86 "templates/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 | LT(n,(0# :: Happy_GHC_Exts.Int#)) -> {- nothing -} (happyReduceArr Happy_Data_Array.! rule) i tk st where rule = (Happy_GHC_Exts.I# ((Happy_GHC_Exts.negateInt# ((n Happy_GHC_Exts.+# (1# :: Happy_GHC_Exts.Int#)))))) n -> {- nothing -} happyShift new_state i tk st where new_state = (n Happy_GHC_Exts.-# (1# :: Happy_GHC_Exts.Int#)) where off = indexShortOffAddr happyActOffsets st off_i = (off Happy_GHC_Exts.+# i) check = if GTE(off_i,(0# :: Happy_GHC_Exts.Int#)) then EQ(indexShortOffAddr happyCheck off_i, i) else False action | check = indexShortOffAddr happyTable off_i | otherwise = indexShortOffAddr happyDefActions st indexShortOffAddr (HappyA# arr) off = Happy_GHC_Exts.narrow16Int# i where i = Happy_GHC_Exts.word2Int# (Happy_GHC_Exts.or# (Happy_GHC_Exts.uncheckedShiftL# high 8#) low) high = Happy_GHC_Exts.int2Word# (Happy_GHC_Exts.ord# (Happy_GHC_Exts.indexCharOffAddr# arr (off' Happy_GHC_Exts.+# 1#))) low = Happy_GHC_Exts.int2Word# (Happy_GHC_Exts.ord# (Happy_GHC_Exts.indexCharOffAddr# arr off')) off' = off Happy_GHC_Exts.*# 2# data HappyAddr = HappyA# Happy_GHC_Exts.Addr# ----------------------------------------------------------------------------- -- HappyState data type (not arrays) {-# LINE 170 "templates/GenericTemplate.hs" #-} ----------------------------------------------------------------------------- -- Shifting a token happyShift new_state 0# tk st sts stk@(x `HappyStk` _) = let i = (case Happy_GHC_Exts.unsafeCoerce# x of { (Happy_GHC_Exts.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 Happy_GHC_Exts.-# (1# :: Happy_GHC_Exts.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 = case happyDrop k (HappyCons (st) (sts)) of sts1@((HappyCons (st1@(action)) (_))) -> let drop_stk = happyDropStk k stk in happyThen1 (fn stk tk) (\r -> happyGoto nt j tk st1 sts1 (r `HappyStk` drop_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 = case happyDrop k (HappyCons (st) (sts)) of sts1@((HappyCons (st1@(action)) (_))) -> let drop_stk = happyDropStk k stk off = indexShortOffAddr happyGotoOffsets st1 off_i = (off Happy_GHC_Exts.+# nt) new_state = indexShortOffAddr happyTable off_i in happyThen1 (fn stk tk) (\r -> happyNewToken new_state sts1 (r `HappyStk` drop_stk)) happyDrop 0# l = l happyDrop n (HappyCons (_) (t)) = happyDrop (n Happy_GHC_Exts.-# (1# :: Happy_GHC_Exts.Int#)) t happyDropStk 0# l = l happyDropStk n (x `HappyStk` xs) = happyDropStk (n Happy_GHC_Exts.-# (1#::Happy_GHC_Exts.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 Happy_GHC_Exts.+# 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@(x `HappyStk` _) = let i = (case Happy_GHC_Exts.unsafeCoerce# x of { (Happy_GHC_Exts.I# (i)) -> i }) in -- trace "failing" $ happyError_ i 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 ( (Happy_GHC_Exts.unsafeCoerce# (Happy_GHC_Exts.I# (i))) `HappyStk` stk) -- Internal happy errors: notHappyAtAll :: a notHappyAtAll = error "Internal Happy error\n" ----------------------------------------------------------------------------- -- Hack to get the typechecker to accept our action functions happyTcHack :: Happy_GHC_Exts.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.