/export/starexec/sandbox/solver/bin/starexec_run_standard /export/starexec/sandbox/benchmark/theBenchmark.hs /export/starexec/sandbox/output/output_files -------------------------------------------------------------------------------- YES proof of /export/starexec/sandbox/benchmark/theBenchmark.hs # AProVE Commit ID: 48fb2092695e11cc9f56e44b17a92a5f88ffb256 marcel 20180622 unpublished dirty H-Termination with start terms of the given HASKELL could be proven: (0) HASKELL (1) CR [EQUIVALENT, 0 ms] (2) HASKELL (3) BR [EQUIVALENT, 0 ms] (4) HASKELL (5) COR [EQUIVALENT, 0 ms] (6) HASKELL (7) Narrow [SOUND, 0 ms] (8) QDP (9) DependencyGraphProof [EQUIVALENT, 0 ms] (10) AND (11) QDP (12) QDPSizeChangeProof [EQUIVALENT, 0 ms] (13) YES (14) QDP (15) QDPSizeChangeProof [EQUIVALENT, 0 ms] (16) YES (17) QDP (18) QDPSizeChangeProof [EQUIVALENT, 0 ms] (19) YES ---------------------------------------- (0) Obligation: mainModule Main module FiniteMap where { import qualified Main; import qualified Maybe; import qualified Prelude; data FiniteMap a b = EmptyFM | Branch a b Int (FiniteMap a b) (FiniteMap a b) ; instance (Eq a, Eq b) => Eq FiniteMap b a where { } elemFM :: Ord b => b -> FiniteMap b a -> Bool; elemFM key fm = case lookupFM fm key of { Nothing-> False; Just elt-> True; } ; lookupFM :: Ord b => FiniteMap b a -> b -> Maybe a; lookupFM EmptyFM key = Nothing; lookupFM (Branch key elt _ fm_l fm_r) key_to_find | key_to_find < key = lookupFM fm_l key_to_find | key_to_find > key = lookupFM fm_r key_to_find | otherwise = Just elt; } module Maybe where { import qualified FiniteMap; import qualified Main; import qualified Prelude; } module Main where { import qualified FiniteMap; import qualified Maybe; import qualified Prelude; } ---------------------------------------- (1) CR (EQUIVALENT) Case Reductions: The following Case expression "case lookupFM fm key of { Nothing -> False; Just elt -> True} " is transformed to "elemFM0 Nothing = False; elemFM0 (Just elt) = True; " ---------------------------------------- (2) Obligation: mainModule Main module FiniteMap where { import qualified Main; import qualified Maybe; import qualified Prelude; data FiniteMap b a = EmptyFM | Branch b a Int (FiniteMap b a) (FiniteMap b a) ; instance (Eq a, Eq b) => Eq FiniteMap a b where { } elemFM :: Ord b => b -> FiniteMap b a -> Bool; elemFM key fm = elemFM0 (lookupFM fm key); elemFM0 Nothing = False; elemFM0 (Just elt) = True; lookupFM :: Ord a => FiniteMap a b -> a -> Maybe b; lookupFM EmptyFM key = Nothing; lookupFM (Branch key elt _ fm_l fm_r) key_to_find | key_to_find < key = lookupFM fm_l key_to_find | key_to_find > key = lookupFM fm_r key_to_find | otherwise = Just elt; } module Maybe where { import qualified FiniteMap; import qualified Main; import qualified Prelude; } module Main where { import qualified FiniteMap; import qualified Maybe; import qualified Prelude; } ---------------------------------------- (3) BR (EQUIVALENT) Replaced joker patterns by fresh variables and removed binding patterns. ---------------------------------------- (4) Obligation: mainModule Main module FiniteMap where { import qualified Main; import qualified Maybe; import qualified Prelude; data FiniteMap b a = EmptyFM | Branch b a Int (FiniteMap b a) (FiniteMap b a) ; instance (Eq a, Eq b) => Eq FiniteMap b a where { } elemFM :: Ord b => b -> FiniteMap b a -> Bool; elemFM key fm = elemFM0 (lookupFM fm key); elemFM0 Nothing = False; elemFM0 (Just elt) = True; lookupFM :: Ord b => FiniteMap b a -> b -> Maybe a; lookupFM EmptyFM key = Nothing; lookupFM (Branch key elt vy fm_l fm_r) key_to_find | key_to_find < key = lookupFM fm_l key_to_find | key_to_find > key = lookupFM fm_r key_to_find | otherwise = Just elt; } module Maybe where { import qualified FiniteMap; import qualified Main; import qualified Prelude; } module Main where { import qualified FiniteMap; import qualified Maybe; import qualified Prelude; } ---------------------------------------- (5) COR (EQUIVALENT) Cond Reductions: The following Function with conditions "compare x y|x == yEQ|x <= yLT|otherwiseGT; " is transformed to "compare x y = compare3 x y; " "compare2 x y True = EQ; compare2 x y False = compare1 x y (x <= y); " "compare0 x y True = GT; " "compare1 x y True = LT; compare1 x y False = compare0 x y otherwise; " "compare3 x y = compare2 x y (x == y); " The following Function with conditions "undefined |Falseundefined; " is transformed to "undefined = undefined1; " "undefined0 True = undefined; " "undefined1 = undefined0 False; " The following Function with conditions "lookupFM EmptyFM key = Nothing; lookupFM (Branch key elt vy fm_l fm_r) key_to_find|key_to_find < keylookupFM fm_l key_to_find|key_to_find > keylookupFM fm_r key_to_find|otherwiseJust elt; " is transformed to "lookupFM EmptyFM key = lookupFM4 EmptyFM key; lookupFM (Branch key elt vy fm_l fm_r) key_to_find = lookupFM3 (Branch key elt vy fm_l fm_r) key_to_find; " "lookupFM0 key elt vy fm_l fm_r key_to_find True = Just elt; " "lookupFM2 key elt vy fm_l fm_r key_to_find True = lookupFM fm_l key_to_find; lookupFM2 key elt vy fm_l fm_r key_to_find False = lookupFM1 key elt vy fm_l fm_r key_to_find (key_to_find > key); " "lookupFM1 key elt vy fm_l fm_r key_to_find True = lookupFM fm_r key_to_find; lookupFM1 key elt vy fm_l fm_r key_to_find False = lookupFM0 key elt vy fm_l fm_r key_to_find otherwise; " "lookupFM3 (Branch key elt vy fm_l fm_r) key_to_find = lookupFM2 key elt vy fm_l fm_r key_to_find (key_to_find < key); " "lookupFM4 EmptyFM key = Nothing; lookupFM4 wv ww = lookupFM3 wv ww; " ---------------------------------------- (6) Obligation: mainModule Main module FiniteMap where { import qualified Main; import qualified Maybe; import qualified Prelude; data FiniteMap a b = EmptyFM | Branch a b Int (FiniteMap a b) (FiniteMap a b) ; instance (Eq a, Eq b) => Eq FiniteMap a b where { } elemFM :: Ord b => b -> FiniteMap b a -> Bool; elemFM key fm = elemFM0 (lookupFM fm key); elemFM0 Nothing = False; elemFM0 (Just elt) = True; lookupFM :: Ord a => FiniteMap a b -> a -> Maybe b; lookupFM EmptyFM key = lookupFM4 EmptyFM key; lookupFM (Branch key elt vy fm_l fm_r) key_to_find = lookupFM3 (Branch key elt vy fm_l fm_r) key_to_find; lookupFM0 key elt vy fm_l fm_r key_to_find True = Just elt; lookupFM1 key elt vy fm_l fm_r key_to_find True = lookupFM fm_r key_to_find; lookupFM1 key elt vy fm_l fm_r key_to_find False = lookupFM0 key elt vy fm_l fm_r key_to_find otherwise; lookupFM2 key elt vy fm_l fm_r key_to_find True = lookupFM fm_l key_to_find; lookupFM2 key elt vy fm_l fm_r key_to_find False = lookupFM1 key elt vy fm_l fm_r key_to_find (key_to_find > key); lookupFM3 (Branch key elt vy fm_l fm_r) key_to_find = lookupFM2 key elt vy fm_l fm_r key_to_find (key_to_find < key); lookupFM4 EmptyFM key = Nothing; lookupFM4 wv ww = lookupFM3 wv ww; } module Maybe where { import qualified FiniteMap; import qualified Main; import qualified Prelude; } module Main where { import qualified FiniteMap; import qualified Maybe; import qualified Prelude; } ---------------------------------------- (7) Narrow (SOUND) Haskell To QDPs digraph dp_graph { node [outthreshold=100, inthreshold=100];1[label="FiniteMap.elemFM",fontsize=16,color="grey",shape="box"];1 -> 3[label="",style="dashed", color="grey", weight=3]; 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113[label="FiniteMap.elemFM0 (FiniteMap.lookupFM1 LT wx41 wx42 wx43 wx44 EQ (compare2 EQ LT (EQ == LT) == GT))",fontsize=16,color="black",shape="box"];113 -> 119[label="",style="solid", color="black", weight=3]; 114[label="FiniteMap.elemFM0 (FiniteMap.lookupFM0 EQ wx41 wx42 wx43 wx44 EQ otherwise)",fontsize=16,color="black",shape="box"];114 -> 120[label="",style="solid", color="black", weight=3]; 115[label="FiniteMap.elemFM0 (FiniteMap.lookupFM1 LT wx41 wx42 wx43 wx44 GT (compare2 GT LT (GT == LT) == GT))",fontsize=16,color="black",shape="box"];115 -> 121[label="",style="solid", color="black", weight=3]; 116[label="FiniteMap.elemFM0 (FiniteMap.lookupFM1 EQ wx41 wx42 wx43 wx44 GT (compare2 GT EQ (GT == EQ) == GT))",fontsize=16,color="black",shape="box"];116 -> 122[label="",style="solid", color="black", weight=3]; 117[label="FiniteMap.elemFM0 (FiniteMap.lookupFM0 GT wx41 wx42 wx43 wx44 GT otherwise)",fontsize=16,color="black",shape="box"];117 -> 123[label="",style="solid", color="black", weight=3]; 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124[label="FiniteMap.elemFM0 (Just wx41)",fontsize=16,color="black",shape="triangle"];124 -> 130[label="",style="solid", color="black", weight=3]; 125[label="FiniteMap.elemFM0 (FiniteMap.lookupFM1 LT wx41 wx42 wx43 wx44 EQ (compare1 EQ LT (EQ <= LT) == GT))",fontsize=16,color="black",shape="box"];125 -> 131[label="",style="solid", color="black", weight=3]; 126 -> 124[label="",style="dashed", color="red", weight=0]; 126[label="FiniteMap.elemFM0 (Just wx41)",fontsize=16,color="magenta"];127[label="FiniteMap.elemFM0 (FiniteMap.lookupFM1 LT wx41 wx42 wx43 wx44 GT (compare1 GT LT (GT <= LT) == GT))",fontsize=16,color="black",shape="box"];127 -> 132[label="",style="solid", color="black", weight=3]; 128[label="FiniteMap.elemFM0 (FiniteMap.lookupFM1 EQ wx41 wx42 wx43 wx44 GT (compare1 GT EQ (GT <= EQ) == GT))",fontsize=16,color="black",shape="box"];128 -> 133[label="",style="solid", color="black", weight=3]; 129 -> 124[label="",style="dashed", color="red", weight=0]; 129[label="FiniteMap.elemFM0 (Just wx41)",fontsize=16,color="magenta"];130[label="True",fontsize=16,color="green",shape="box"];131[label="FiniteMap.elemFM0 (FiniteMap.lookupFM1 LT wx41 wx42 wx43 wx44 EQ (compare1 EQ LT False == GT))",fontsize=16,color="black",shape="box"];131 -> 134[label="",style="solid", color="black", weight=3]; 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137[label="FiniteMap.elemFM0 (FiniteMap.lookupFM1 LT wx41 wx42 wx43 wx44 EQ (compare0 EQ LT True == GT))",fontsize=16,color="black",shape="box"];137 -> 140[label="",style="solid", color="black", weight=3]; 138[label="FiniteMap.elemFM0 (FiniteMap.lookupFM1 LT wx41 wx42 wx43 wx44 GT (compare0 GT LT True == GT))",fontsize=16,color="black",shape="box"];138 -> 141[label="",style="solid", color="black", weight=3]; 139[label="FiniteMap.elemFM0 (FiniteMap.lookupFM1 EQ wx41 wx42 wx43 wx44 GT (compare0 GT EQ True == GT))",fontsize=16,color="black",shape="box"];139 -> 142[label="",style="solid", color="black", weight=3]; 140[label="FiniteMap.elemFM0 (FiniteMap.lookupFM1 LT wx41 wx42 wx43 wx44 EQ (GT == GT))",fontsize=16,color="black",shape="box"];140 -> 143[label="",style="solid", color="black", weight=3]; 141[label="FiniteMap.elemFM0 (FiniteMap.lookupFM1 LT wx41 wx42 wx43 wx44 GT (GT == GT))",fontsize=16,color="black",shape="box"];141 -> 144[label="",style="solid", color="black", weight=3]; 142[label="FiniteMap.elemFM0 (FiniteMap.lookupFM1 EQ wx41 wx42 wx43 wx44 GT (GT == GT))",fontsize=16,color="black",shape="box"];142 -> 145[label="",style="solid", color="black", weight=3]; 143[label="FiniteMap.elemFM0 (FiniteMap.lookupFM1 LT wx41 wx42 wx43 wx44 EQ True)",fontsize=16,color="black",shape="box"];143 -> 146[label="",style="solid", color="black", weight=3]; 144[label="FiniteMap.elemFM0 (FiniteMap.lookupFM1 LT wx41 wx42 wx43 wx44 GT True)",fontsize=16,color="black",shape="box"];144 -> 147[label="",style="solid", color="black", weight=3]; 145[label="FiniteMap.elemFM0 (FiniteMap.lookupFM1 EQ wx41 wx42 wx43 wx44 GT True)",fontsize=16,color="black",shape="box"];145 -> 148[label="",style="solid", color="black", weight=3]; 146 -> 5[label="",style="dashed", color="red", weight=0]; 146[label="FiniteMap.elemFM0 (FiniteMap.lookupFM wx44 EQ)",fontsize=16,color="magenta"];146 -> 149[label="",style="dashed", color="magenta", weight=3]; 146 -> 150[label="",style="dashed", color="magenta", weight=3]; 147 -> 5[label="",style="dashed", color="red", weight=0]; 147[label="FiniteMap.elemFM0 (FiniteMap.lookupFM wx44 GT)",fontsize=16,color="magenta"];147 -> 151[label="",style="dashed", color="magenta", weight=3]; 147 -> 152[label="",style="dashed", color="magenta", weight=3]; 148 -> 5[label="",style="dashed", color="red", weight=0]; 148[label="FiniteMap.elemFM0 (FiniteMap.lookupFM wx44 GT)",fontsize=16,color="magenta"];148 -> 153[label="",style="dashed", color="magenta", weight=3]; 148 -> 154[label="",style="dashed", color="magenta", weight=3]; 149[label="wx44",fontsize=16,color="green",shape="box"];150[label="EQ",fontsize=16,color="green",shape="box"];151[label="wx44",fontsize=16,color="green",shape="box"];152[label="GT",fontsize=16,color="green",shape="box"];153[label="wx44",fontsize=16,color="green",shape="box"];154[label="GT",fontsize=16,color="green",shape="box"];} ---------------------------------------- (8) Obligation: Q DP problem: The TRS P consists of the following rules: new_elemFM0(Branch(LT, wx41, wx42, wx43, wx44), EQ, h) -> new_elemFM0(wx44, EQ, h) new_elemFM0(Branch(EQ, wx41, wx42, wx43, wx44), GT, h) -> new_elemFM0(wx44, GT, h) new_elemFM0(Branch(EQ, wx41, wx42, wx43, wx44), LT, h) -> new_elemFM0(wx43, LT, h) new_elemFM0(Branch(GT, wx41, wx42, wx43, wx44), LT, h) -> new_elemFM0(wx43, LT, h) new_elemFM0(Branch(LT, wx41, wx42, wx43, wx44), GT, h) -> new_elemFM0(wx44, GT, h) new_elemFM0(Branch(GT, wx41, wx42, wx43, wx44), EQ, h) -> new_elemFM0(wx43, EQ, h) R is empty. Q is empty. We have to consider all minimal (P,Q,R)-chains. ---------------------------------------- (9) DependencyGraphProof (EQUIVALENT) The approximation of the Dependency Graph [LPAR04,FROCOS05,EDGSTAR] contains 3 SCCs. ---------------------------------------- (10) Complex Obligation (AND) ---------------------------------------- (11) Obligation: Q DP problem: The TRS P consists of the following rules: new_elemFM0(Branch(GT, wx41, wx42, wx43, wx44), LT, h) -> new_elemFM0(wx43, LT, h) new_elemFM0(Branch(EQ, wx41, wx42, wx43, wx44), LT, h) -> new_elemFM0(wx43, LT, h) R is empty. Q is empty. We have to consider all minimal (P,Q,R)-chains. ---------------------------------------- (12) QDPSizeChangeProof (EQUIVALENT) By using the subterm criterion [SUBTERM_CRITERION] together with the size-change analysis [AAECC05] we have proven that there are no infinite chains for this DP problem. From the DPs we obtained the following set of size-change graphs: *new_elemFM0(Branch(GT, wx41, wx42, wx43, wx44), LT, h) -> new_elemFM0(wx43, LT, h) The graph contains the following edges 1 > 1, 2 >= 2, 3 >= 3 *new_elemFM0(Branch(EQ, wx41, wx42, wx43, wx44), LT, h) -> new_elemFM0(wx43, LT, h) The graph contains the following edges 1 > 1, 2 >= 2, 3 >= 3 ---------------------------------------- (13) YES ---------------------------------------- (14) Obligation: Q DP problem: The TRS P consists of the following rules: new_elemFM0(Branch(LT, wx41, wx42, wx43, wx44), GT, h) -> new_elemFM0(wx44, GT, h) new_elemFM0(Branch(EQ, wx41, wx42, wx43, wx44), GT, h) -> new_elemFM0(wx44, GT, h) R is empty. Q is empty. We have to consider all minimal (P,Q,R)-chains. ---------------------------------------- (15) QDPSizeChangeProof (EQUIVALENT) By using the subterm criterion [SUBTERM_CRITERION] together with the size-change analysis [AAECC05] we have proven that there are no infinite chains for this DP problem. From the DPs we obtained the following set of size-change graphs: *new_elemFM0(Branch(LT, wx41, wx42, wx43, wx44), GT, h) -> new_elemFM0(wx44, GT, h) The graph contains the following edges 1 > 1, 2 >= 2, 3 >= 3 *new_elemFM0(Branch(EQ, wx41, wx42, wx43, wx44), GT, h) -> new_elemFM0(wx44, GT, h) The graph contains the following edges 1 > 1, 2 >= 2, 3 >= 3 ---------------------------------------- (16) YES ---------------------------------------- (17) Obligation: Q DP problem: The TRS P consists of the following rules: new_elemFM0(Branch(GT, wx41, wx42, wx43, wx44), EQ, h) -> new_elemFM0(wx43, EQ, h) new_elemFM0(Branch(LT, wx41, wx42, wx43, wx44), EQ, h) -> new_elemFM0(wx44, EQ, h) R is empty. Q is empty. We have to consider all minimal (P,Q,R)-chains. ---------------------------------------- (18) QDPSizeChangeProof (EQUIVALENT) By using the subterm criterion [SUBTERM_CRITERION] together with the size-change analysis [AAECC05] we have proven that there are no infinite chains for this DP problem. From the DPs we obtained the following set of size-change graphs: *new_elemFM0(Branch(GT, wx41, wx42, wx43, wx44), EQ, h) -> new_elemFM0(wx43, EQ, h) The graph contains the following edges 1 > 1, 2 >= 2, 3 >= 3 *new_elemFM0(Branch(LT, wx41, wx42, wx43, wx44), EQ, h) -> new_elemFM0(wx44, EQ, h) The graph contains the following edges 1 > 1, 2 >= 2, 3 >= 3 ---------------------------------------- (19) YES