/export/starexec/sandbox/solver/bin/starexec_run_standard /export/starexec/sandbox/benchmark/theBenchmark.hs /export/starexec/sandbox/output/output_files


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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# AProVE Commit ID: 48fb2092695e11cc9f56e44b17a92a5f88ffb256 marcel 20180622 unpublished dirty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) BR [EQUIVALENT, 0 ms]
(2) HASKELL
(3) COR [EQUIVALENT, 0 ms]
(4) HASKELL
(5) Narrow [SOUND, 0 ms]
(6) QDP
(7) QDPSizeChangeProof [EQUIVALENT, 0 ms]
(8) YES


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(0)
Obligation:
mainModule Main 
module Main where {
import qualified Prelude;
data List a = Cons a (List a)  | Nil ;

data MyBool = MyTrue  | MyFalse ;

dropWhile :: (a  ->  MyBool)  ->  List a  ->  List a;
dropWhile p Nil = dropWhile3 p Nil;
dropWhile p (Cons vv vw) = dropWhile2 p (Cons vv vw);

dropWhile0 p vv vw MyTrue = Cons vv vw;

dropWhile1 p vv vw MyTrue = dropWhile p vw;
dropWhile1 p vv vw MyFalse = dropWhile0 p vv vw otherwise;

dropWhile2 p (Cons vv vw) = dropWhile1 p vv vw (p vv);

dropWhile3 p Nil = Nil;
dropWhile3 vz wu = dropWhile2 vz wu;

otherwise :: MyBool;
otherwise = MyTrue;

}

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(1) BR (EQUIVALENT)
Replaced joker patterns by fresh variables and removed binding patterns.
----------------------------------------

(2)
Obligation:
mainModule Main 
module Main where {
import qualified Prelude;
data List a = Cons a (List a)  | Nil ;

data MyBool = MyTrue  | MyFalse ;

dropWhile :: (a  ->  MyBool)  ->  List a  ->  List a;
dropWhile p Nil = dropWhile3 p Nil;
dropWhile p (Cons vv vw) = dropWhile2 p (Cons vv vw);

dropWhile0 p vv vw MyTrue = Cons vv vw;

dropWhile1 p vv vw MyTrue = dropWhile p vw;
dropWhile1 p vv vw MyFalse = dropWhile0 p vv vw otherwise;

dropWhile2 p (Cons vv vw) = dropWhile1 p vv vw (p vv);

dropWhile3 p Nil = Nil;
dropWhile3 vz wu = dropWhile2 vz wu;

otherwise :: MyBool;
otherwise = MyTrue;

}

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(3) COR (EQUIVALENT)
Cond Reductions:
The following Function with conditions
"undefined |Falseundefined;
"
is transformed to
"undefined  = undefined1;
"
"undefined0 True = undefined;
"
"undefined1  = undefined0 False;
"

----------------------------------------

(4)
Obligation:
mainModule Main 
module Main where {
import qualified Prelude;
data List a = Cons a (List a)  | Nil ;

data MyBool = MyTrue  | MyFalse ;

dropWhile :: (a  ->  MyBool)  ->  List a  ->  List a;
dropWhile p Nil = dropWhile3 p Nil;
dropWhile p (Cons vv vw) = dropWhile2 p (Cons vv vw);

dropWhile0 p vv vw MyTrue = Cons vv vw;

dropWhile1 p vv vw MyTrue = dropWhile p vw;
dropWhile1 p vv vw MyFalse = dropWhile0 p vv vw otherwise;

dropWhile2 p (Cons vv vw) = dropWhile1 p vv vw (p vv);

dropWhile3 p Nil = Nil;
dropWhile3 vz wu = dropWhile2 vz wu;

otherwise :: MyBool;
otherwise = MyTrue;

}

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(5) Narrow (SOUND)
Haskell To QDPs

digraph dp_graph {
node [outthreshold=100, inthreshold=100];1[label="dropWhile",fontsize=16,color="grey",shape="box"];1 -> 3[label="",style="dashed", color="grey", weight=3];
3[label="dropWhile wv3",fontsize=16,color="grey",shape="box"];3 -> 4[label="",style="dashed", color="grey", weight=3];
4[label="dropWhile wv3 wv4",fontsize=16,color="burlywood",shape="triangle"];22[label="wv4/Cons wv40 wv41",fontsize=10,color="white",style="solid",shape="box"];4 -> 22[label="",style="solid", color="burlywood", weight=9];
22 -> 5[label="",style="solid", color="burlywood", weight=3];
23[label="wv4/Nil",fontsize=10,color="white",style="solid",shape="box"];4 -> 23[label="",style="solid", color="burlywood", weight=9];
23 -> 6[label="",style="solid", color="burlywood", weight=3];
5[label="dropWhile wv3 (Cons wv40 wv41)",fontsize=16,color="black",shape="box"];5 -> 7[label="",style="solid", color="black", weight=3];
6[label="dropWhile wv3 Nil",fontsize=16,color="black",shape="box"];6 -> 8[label="",style="solid", color="black", weight=3];
7[label="dropWhile2 wv3 (Cons wv40 wv41)",fontsize=16,color="black",shape="box"];7 -> 9[label="",style="solid", color="black", weight=3];
8[label="dropWhile3 wv3 Nil",fontsize=16,color="black",shape="box"];8 -> 10[label="",style="solid", color="black", weight=3];
9 -> 11[label="",style="dashed", color="red", weight=0];
9[label="dropWhile1 wv3 wv40 wv41 (wv3 wv40)",fontsize=16,color="magenta"];9 -> 12[label="",style="dashed", color="magenta", weight=3];
10[label="Nil",fontsize=16,color="green",shape="box"];12[label="wv3 wv40",fontsize=16,color="green",shape="box"];12 -> 16[label="",style="dashed", color="green", weight=3];
11[label="dropWhile1 wv3 wv40 wv41 wv5",fontsize=16,color="burlywood",shape="triangle"];24[label="wv5/MyTrue",fontsize=10,color="white",style="solid",shape="box"];11 -> 24[label="",style="solid", color="burlywood", weight=9];
24 -> 14[label="",style="solid", color="burlywood", weight=3];
25[label="wv5/MyFalse",fontsize=10,color="white",style="solid",shape="box"];11 -> 25[label="",style="solid", color="burlywood", weight=9];
25 -> 15[label="",style="solid", color="burlywood", weight=3];
16[label="wv40",fontsize=16,color="green",shape="box"];14[label="dropWhile1 wv3 wv40 wv41 MyTrue",fontsize=16,color="black",shape="box"];14 -> 17[label="",style="solid", color="black", weight=3];
15[label="dropWhile1 wv3 wv40 wv41 MyFalse",fontsize=16,color="black",shape="box"];15 -> 18[label="",style="solid", color="black", weight=3];
17 -> 4[label="",style="dashed", color="red", weight=0];
17[label="dropWhile wv3 wv41",fontsize=16,color="magenta"];17 -> 19[label="",style="dashed", color="magenta", weight=3];
18[label="dropWhile0 wv3 wv40 wv41 otherwise",fontsize=16,color="black",shape="box"];18 -> 20[label="",style="solid", color="black", weight=3];
19[label="wv41",fontsize=16,color="green",shape="box"];20[label="dropWhile0 wv3 wv40 wv41 MyTrue",fontsize=16,color="black",shape="box"];20 -> 21[label="",style="solid", color="black", weight=3];
21[label="Cons wv40 wv41",fontsize=16,color="green",shape="box"];}

----------------------------------------

(6)
Obligation:
Q DP problem:
The TRS P consists of the following rules:

   new_dropWhile1(wv3, wv40, wv41, h) -> new_dropWhile(wv3, wv41, h)
   new_dropWhile(wv3, Cons(wv40, wv41), h) -> new_dropWhile1(wv3, wv40, wv41, h)

R is empty.
Q is empty.
We have to consider all minimal (P,Q,R)-chains.
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(7) 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_dropWhile(wv3, Cons(wv40, wv41), h) -> new_dropWhile1(wv3, wv40, wv41, h)
The graph contains the following edges 1 >= 1, 2 > 2, 2 > 3, 3 >= 4


*new_dropWhile1(wv3, wv40, wv41, h) -> new_dropWhile(wv3, wv41, h)
The graph contains the following edges 1 >= 1, 3 >= 2, 4 >= 3


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(8)
YES