LTS Termination Proof

by AProVE

Input

Integer Transition System

Proof

1 Switch to Cooperation Termination Proof

We consider the following cutpoint-transitions:
l5 l5 l5: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
l7 l7 l7: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
l11 l11 l11: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
l3 l3 l3: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
l13 l13 l13: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
l17 l17 l17: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
l2 l2 l2: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
l9 l9 l9: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
l14 l14 l14: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
l4 l4 l4: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
l10 l10 l10: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
l6 l6 l6: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
l8 l8 l8: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
l15 l15 l15: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
l16 l16 l16: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
l0 l0 l0: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
l12 l12 l12: x1 = x1x2 = x2x3 = x3x4 = x4x5 = x5x6 = x6x7 = x7x8 = x8x9 = x9
and for every transition t, a duplicate t is considered.

2 SCC Decomposition

We consider subproblems for each of the 4 SCC(s) of the program graph.

2.1 SCC Subproblem 1/4

Here we consider the SCC { l4, l3, l13, l15, l14 }.

2.1.1 Transition Removal

We remove transition 21 using the following ranking functions, which are bounded by 0.

l3: −1 − x4 + x6
l4: −1 − x4 + x6
l14: −2 − x4 + x6
l15: −2 − x4 + x6
l13: −2 − x4 + x6

2.1.2 Transition Removal

We remove transitions 3, 16, 19, 15, 18, 17 using the following ranking functions, which are bounded by 0.

l3: 0
l4: −1
l14: 1
l15: 3
l13: 2

2.1.3 Trivial Cooperation Program

There are no more "sharp" transitions in the cooperation program. Hence the cooperation termination is proved.

2.2 SCC Subproblem 2/4

Here we consider the SCC { l10, l11, l8, l12, l9 }.

2.2.1 Transition Removal

We remove transition 14 using the following ranking functions, which are bounded by 0.

l8: −1 − x4 + x6
l9: −1 − x4 + x6
l12: −2 − x4 + x6
l11: −2 − x4 + x6
l10: −2 − x4 + x6

2.2.2 Transition Removal

We remove transitions 8, 10 using the following ranking functions, which are bounded by 0.

l8: 0
l9: −1
l12: 1
l11: 1
l10: 1

2.2.3 Transition Removal

We remove transition 11 using the following ranking functions, which are bounded by 0.

l11: −1 + x3x5
l12: −1 + x3x5
l10: −2 + x3x5

2.2.4 Transition Removal

We remove transitions 12, 9 using the following ranking functions, which are bounded by 0.

l11: 0
l12: −1
l10: 1

2.2.5 Trivial Cooperation Program

There are no more "sharp" transitions in the cooperation program. Hence the cooperation termination is proved.

2.3 SCC Subproblem 3/4

Here we consider the SCC { l5, l7, l6 }.

2.3.1 Transition Removal

We remove transition 7 using the following ranking functions, which are bounded by 0.

l6: 3⋅x3 − 3⋅x4 + 3
l7: 3⋅x3 − 3⋅x4 + 2
l5: 3⋅x3 − 3⋅x4 + 1

2.3.2 Transition Removal

We remove transitions 22, 4 using the following ranking functions, which are bounded by 0.

l6: 0
l7: −1
l5: 1

2.3.3 Trivial Cooperation Program

There are no more "sharp" transitions in the cooperation program. Hence the cooperation termination is proved.

2.4 SCC Subproblem 4/4

Here we consider the SCC { l0, l2 }.

2.4.1 Transition Removal

We remove transition 2 using the following ranking functions, which are bounded by 0.

l0: −2⋅x4 + 2⋅x6
l2: −2⋅x4 + 2⋅x6 + 1

2.4.2 Transition Removal

We remove transition 23 using the following ranking functions, which are bounded by 0.

l2: 0
l0: −1

2.4.3 Trivial Cooperation Program

There are no more "sharp" transitions in the cooperation program. Hence the cooperation termination is proved.

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