/export/starexec/sandbox/solver/bin/starexec_run_c_complexity /export/starexec/sandbox/benchmark/theBenchmark.c /export/starexec/sandbox/output/output_files


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WORST_CASE(?, O(n^1))
proof of /export/starexec/sandbox/output/output_files/bench.koat
# AProVE Commit ID: 48fb2092695e11cc9f56e44b17a92a5f88ffb256 marcel 20180622 unpublished dirty


The runtime complexity of the given CpxIntTrs could be proven to be BOUNDS(1, n^1).

(0) CpxIntTrs
(1) Koat Proof [FINISHED, 359 ms]
(2) BOUNDS(1, n^1)


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(0)
Obligation:
Complexity Int TRS consisting of the following rules:
eval_foo_start(v_.0, v_1, v_i) -> Com_1(eval_foo_bb0_in(v_.0, v_1, v_i)) :|: TRUE
eval_foo_bb0_in(v_.0, v_1, v_i) -> Com_1(eval_foo_bb1_in(v_i, v_1, v_i)) :|: TRUE
eval_foo_bb1_in(v_.0, v_1, v_i) -> Com_1(eval_foo_bb2_in(v_.0, v_1, v_i)) :|: v_.0 < 255
eval_foo_bb1_in(v_.0, v_1, v_i) -> Com_1(eval_foo_bb3_in(v_.0, v_1, v_i)) :|: v_.0 >= 255
eval_foo_bb2_in(v_.0, v_1, v_i) -> Com_1(eval_foo_0(v_.0, v_1, v_i)) :|: TRUE
eval_foo_0(v_.0, v_1, v_i) -> Com_2(eval___VERIFIER_nondet_int_start(v_.0, v_1, v_i), eval_foo_1(v_.0, nondef.0, v_i)) :|: TRUE
eval_foo_1(v_.0, v_1, v_i) -> Com_1(eval_foo_bb1_in(v_.0 + 1, v_1, v_i)) :|: v_1 < 0
eval_foo_1(v_.0, v_1, v_i) -> Com_1(eval_foo_bb1_in(v_.0 + 1, v_1, v_i)) :|: v_1 > 0
eval_foo_1(v_.0, v_1, v_i) -> Com_1(eval_foo_bb1_in(v_.0 + 2, v_1, v_i)) :|: v_1 >= 0 && v_1 <= 0
eval_foo_bb3_in(v_.0, v_1, v_i) -> Com_1(eval_foo_stop(v_.0, v_1, v_i)) :|: TRUE

The start-symbols are:[eval_foo_start_3]


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(1) Koat Proof (FINISHED)
YES(?, 48*ar_1 + 12246)



Initial complexity problem:

1:	T:

		(Comp: ?, Cost: 1)    evalfoostart(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb0in(ar_0, ar_1, ar_2, ar_3))

		(Comp: ?, Cost: 1)    evalfoobb0in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_1, ar_1, ar_2, ar_3))

		(Comp: ?, Cost: 1)    evalfoobb1in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb2in(ar_0, ar_1, ar_2, ar_3)) [ 254 >= ar_0 ]

		(Comp: ?, Cost: 1)    evalfoobb1in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb3in(ar_0, ar_1, ar_2, ar_3)) [ ar_0 >= 255 ]

		(Comp: ?, Cost: 1)    evalfoobb2in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoo0(ar_0, ar_1, ar_2, ar_3))

		(Comp: ?, Cost: 1)    evalfoo00(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalVERIFIERnondetintstart(ar_0, ar_1, ar_2, ar_3))

		(Comp: ?, Cost: 1)    evalfoo01(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoo1(ar_0, ar_1, ar_3, ar_3))

		(Comp: ?, Cost: 1)    evalfoo0(ar_0, ar_1, ar_2, ar_3) -> Com_2(evalfoo00(ar_0, ar_1, ar_2, e), evalfoo01(ar_0, ar_1, ar_2, e))

		(Comp: ?, Cost: 1)    evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 1, ar_1, ar_2, ar_3)) [ 0 >= ar_2 + 1 ]

		(Comp: ?, Cost: 1)    evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 1, ar_1, ar_2, ar_3)) [ ar_2 >= 1 ]

		(Comp: ?, Cost: 1)    evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 2, ar_1, ar_2, ar_3)) [ ar_2 = 0 ]

		(Comp: ?, Cost: 1)    evalfoobb3in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoostop(ar_0, ar_1, ar_2, ar_3))

		(Comp: 1, Cost: 0)    koat_start(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoostart(ar_0, ar_1, ar_2, ar_3)) [ 0 <= 0 ]

	start location:	koat_start

	leaf cost:	0



Repeatedly propagating knowledge in problem 1 produces the following problem:

2:	T:

		(Comp: 1, Cost: 1)    evalfoostart(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb0in(ar_0, ar_1, ar_2, ar_3))

		(Comp: 1, Cost: 1)    evalfoobb0in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_1, ar_1, ar_2, ar_3))

		(Comp: ?, Cost: 1)    evalfoobb1in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb2in(ar_0, ar_1, ar_2, ar_3)) [ 254 >= ar_0 ]

		(Comp: ?, Cost: 1)    evalfoobb1in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb3in(ar_0, ar_1, ar_2, ar_3)) [ ar_0 >= 255 ]

		(Comp: ?, Cost: 1)    evalfoobb2in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoo0(ar_0, ar_1, ar_2, ar_3))

		(Comp: ?, Cost: 1)    evalfoo00(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalVERIFIERnondetintstart(ar_0, ar_1, ar_2, ar_3))

		(Comp: ?, Cost: 1)    evalfoo01(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoo1(ar_0, ar_1, ar_3, ar_3))

		(Comp: ?, Cost: 1)    evalfoo0(ar_0, ar_1, ar_2, ar_3) -> Com_2(evalfoo00(ar_0, ar_1, ar_2, e), evalfoo01(ar_0, ar_1, ar_2, e))

		(Comp: ?, Cost: 1)    evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 1, ar_1, ar_2, ar_3)) [ 0 >= ar_2 + 1 ]

		(Comp: ?, Cost: 1)    evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 1, ar_1, ar_2, ar_3)) [ ar_2 >= 1 ]

		(Comp: ?, Cost: 1)    evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 2, ar_1, ar_2, ar_3)) [ ar_2 = 0 ]

		(Comp: ?, Cost: 1)    evalfoobb3in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoostop(ar_0, ar_1, ar_2, ar_3))

		(Comp: 1, Cost: 0)    koat_start(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoostart(ar_0, ar_1, ar_2, ar_3)) [ 0 <= 0 ]

	start location:	koat_start

	leaf cost:	0



A polynomial rank function with

	Pol(evalfoostart) = 2

	Pol(evalfoobb0in) = 2

	Pol(evalfoobb1in) = 2

	Pol(evalfoobb2in) = 2

	Pol(evalfoobb3in) = 1

	Pol(evalfoo0) = 2

	Pol(evalfoo00) = 0

	Pol(evalVERIFIERnondetintstart) = 0

	Pol(evalfoo01) = 2

	Pol(evalfoo1) = 2

	Pol(evalfoostop) = 0

	Pol(koat_start) = 2

orients all transitions weakly and the transitions

	evalfoobb3in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoostop(ar_0, ar_1, ar_2, ar_3))

	evalfoobb1in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb3in(ar_0, ar_1, ar_2, ar_3)) [ ar_0 >= 255 ]

strictly and produces the following problem:

3:	T:

		(Comp: 1, Cost: 1)    evalfoostart(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb0in(ar_0, ar_1, ar_2, ar_3))

		(Comp: 1, Cost: 1)    evalfoobb0in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_1, ar_1, ar_2, ar_3))

		(Comp: ?, Cost: 1)    evalfoobb1in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb2in(ar_0, ar_1, ar_2, ar_3)) [ 254 >= ar_0 ]

		(Comp: 2, Cost: 1)    evalfoobb1in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb3in(ar_0, ar_1, ar_2, ar_3)) [ ar_0 >= 255 ]

		(Comp: ?, Cost: 1)    evalfoobb2in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoo0(ar_0, ar_1, ar_2, ar_3))

		(Comp: ?, Cost: 1)    evalfoo00(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalVERIFIERnondetintstart(ar_0, ar_1, ar_2, ar_3))

		(Comp: ?, Cost: 1)    evalfoo01(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoo1(ar_0, ar_1, ar_3, ar_3))

		(Comp: ?, Cost: 1)    evalfoo0(ar_0, ar_1, ar_2, ar_3) -> Com_2(evalfoo00(ar_0, ar_1, ar_2, e), evalfoo01(ar_0, ar_1, ar_2, e))

		(Comp: ?, Cost: 1)    evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 1, ar_1, ar_2, ar_3)) [ 0 >= ar_2 + 1 ]

		(Comp: ?, Cost: 1)    evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 1, ar_1, ar_2, ar_3)) [ ar_2 >= 1 ]

		(Comp: ?, Cost: 1)    evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 2, ar_1, ar_2, ar_3)) [ ar_2 = 0 ]

		(Comp: 2, Cost: 1)    evalfoobb3in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoostop(ar_0, ar_1, ar_2, ar_3))

		(Comp: 1, Cost: 0)    koat_start(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoostart(ar_0, ar_1, ar_2, ar_3)) [ 0 <= 0 ]

	start location:	koat_start

	leaf cost:	0



Applied AI with 'oct' on problem 3 to obtain the following invariants:

  For symbol evalfoo0: -X_2 + 254 >= 0 /\ X_1 - X_2 >= 0 /\ -X_1 - X_2 + 508 >= 0 /\ -X_1 + 254 >= 0

  For symbol evalfoo00: -X_2 + 254 >= 0 /\ X_1 - X_2 >= 0 /\ -X_1 - X_2 + 508 >= 0 /\ -X_1 + 254 >= 0

  For symbol evalfoo01: -X_2 + 254 >= 0 /\ X_1 - X_2 >= 0 /\ -X_1 - X_2 + 508 >= 0 /\ -X_1 + 254 >= 0

  For symbol evalfoo1: X_3 - X_4 >= 0 /\ -X_3 + X_4 >= 0 /\ -X_2 + 254 >= 0 /\ X_1 - X_2 >= 0 /\ -X_1 - X_2 + 508 >= 0 /\ -X_1 + 254 >= 0

  For symbol evalfoobb1in: X_1 - X_2 >= 0

  For symbol evalfoobb2in: -X_2 + 254 >= 0 /\ X_1 - X_2 >= 0 /\ -X_1 - X_2 + 508 >= 0 /\ -X_1 + 254 >= 0

  For symbol evalfoobb3in: X_1 - X_2 >= 0 /\ X_1 - 255 >= 0





This yielded the following problem:

4:	T:

		(Comp: 1, Cost: 0)    koat_start(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoostart(ar_0, ar_1, ar_2, ar_3)) [ 0 <= 0 ]

		(Comp: 2, Cost: 1)    evalfoobb3in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoostop(ar_0, ar_1, ar_2, ar_3)) [ ar_0 - ar_1 >= 0 /\ ar_0 - 255 >= 0 ]

		(Comp: ?, Cost: 1)    evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 2, ar_1, ar_2, ar_3)) [ ar_2 - ar_3 >= 0 /\ -ar_2 + ar_3 >= 0 /\ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 /\ ar_2 = 0 ]

		(Comp: ?, Cost: 1)    evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 1, ar_1, ar_2, ar_3)) [ ar_2 - ar_3 >= 0 /\ -ar_2 + ar_3 >= 0 /\ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 /\ ar_2 >= 1 ]

		(Comp: ?, Cost: 1)    evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 1, ar_1, ar_2, ar_3)) [ ar_2 - ar_3 >= 0 /\ -ar_2 + ar_3 >= 0 /\ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 /\ 0 >= ar_2 + 1 ]

		(Comp: ?, Cost: 1)    evalfoo0(ar_0, ar_1, ar_2, ar_3) -> Com_2(evalfoo00(ar_0, ar_1, ar_2, e), evalfoo01(ar_0, ar_1, ar_2, e)) [ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 ]

		(Comp: ?, Cost: 1)    evalfoo01(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoo1(ar_0, ar_1, ar_3, ar_3)) [ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 ]

		(Comp: ?, Cost: 1)    evalfoo00(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalVERIFIERnondetintstart(ar_0, ar_1, ar_2, ar_3)) [ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 ]

		(Comp: ?, Cost: 1)    evalfoobb2in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoo0(ar_0, ar_1, ar_2, ar_3)) [ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 ]

		(Comp: 2, Cost: 1)    evalfoobb1in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb3in(ar_0, ar_1, ar_2, ar_3)) [ ar_0 - ar_1 >= 0 /\ ar_0 >= 255 ]

		(Comp: ?, Cost: 1)    evalfoobb1in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb2in(ar_0, ar_1, ar_2, ar_3)) [ ar_0 - ar_1 >= 0 /\ 254 >= ar_0 ]

		(Comp: 1, Cost: 1)    evalfoobb0in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_1, ar_1, ar_2, ar_3))

		(Comp: 1, Cost: 1)    evalfoostart(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb0in(ar_0, ar_1, ar_2, ar_3))

	start location:	koat_start

	leaf cost:	0



A polynomial rank function with

	Pol(koat_start) = -6*V_2 + 1530

	Pol(evalfoostart) = -6*V_2 + 1530

	Pol(evalfoobb3in) = -6*V_1

	Pol(evalfoostop) = -6*V_1

	Pol(evalfoo1) = -6*V_1 + 1525

	Pol(evalfoobb1in) = -6*V_1 + 1530

	Pol(evalfoo0) = -6*V_1 + 1528

	Pol(evalfoo00) = 1

	Pol(evalfoo01) = -6*V_1 + 1526

	Pol(evalVERIFIERnondetintstart) = 0

	Pol(evalfoobb2in) = -6*V_1 + 1529

	Pol(evalfoobb0in) = -6*V_2 + 1530

orients all transitions weakly and the transitions

	evalfoobb2in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoo0(ar_0, ar_1, ar_2, ar_3)) [ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 ]

	evalfoobb1in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb2in(ar_0, ar_1, ar_2, ar_3)) [ ar_0 - ar_1 >= 0 /\ 254 >= ar_0 ]

	evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 2, ar_1, ar_2, ar_3)) [ ar_2 - ar_3 >= 0 /\ -ar_2 + ar_3 >= 0 /\ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 /\ ar_2 = 0 ]

	evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 1, ar_1, ar_2, ar_3)) [ ar_2 - ar_3 >= 0 /\ -ar_2 + ar_3 >= 0 /\ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 /\ ar_2 >= 1 ]

	evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 1, ar_1, ar_2, ar_3)) [ ar_2 - ar_3 >= 0 /\ -ar_2 + ar_3 >= 0 /\ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 /\ 0 >= ar_2 + 1 ]

	evalfoo01(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoo1(ar_0, ar_1, ar_3, ar_3)) [ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 ]

	evalfoo00(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalVERIFIERnondetintstart(ar_0, ar_1, ar_2, ar_3)) [ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 ]

	evalfoo0(ar_0, ar_1, ar_2, ar_3) -> Com_2(evalfoo00(ar_0, ar_1, ar_2, e), evalfoo01(ar_0, ar_1, ar_2, e)) [ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 ]

strictly and produces the following problem:

5:	T:

		(Comp: 1, Cost: 0)                koat_start(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoostart(ar_0, ar_1, ar_2, ar_3)) [ 0 <= 0 ]

		(Comp: 2, Cost: 1)                evalfoobb3in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoostop(ar_0, ar_1, ar_2, ar_3)) [ ar_0 - ar_1 >= 0 /\ ar_0 - 255 >= 0 ]

		(Comp: 6*ar_1 + 1530, Cost: 1)    evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 2, ar_1, ar_2, ar_3)) [ ar_2 - ar_3 >= 0 /\ -ar_2 + ar_3 >= 0 /\ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 /\ ar_2 = 0 ]

		(Comp: 6*ar_1 + 1530, Cost: 1)    evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 1, ar_1, ar_2, ar_3)) [ ar_2 - ar_3 >= 0 /\ -ar_2 + ar_3 >= 0 /\ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 /\ ar_2 >= 1 ]

		(Comp: 6*ar_1 + 1530, Cost: 1)    evalfoo1(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_0 + 1, ar_1, ar_2, ar_3)) [ ar_2 - ar_3 >= 0 /\ -ar_2 + ar_3 >= 0 /\ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 /\ 0 >= ar_2 + 1 ]

		(Comp: 6*ar_1 + 1530, Cost: 1)    evalfoo0(ar_0, ar_1, ar_2, ar_3) -> Com_2(evalfoo00(ar_0, ar_1, ar_2, e), evalfoo01(ar_0, ar_1, ar_2, e)) [ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 ]

		(Comp: 6*ar_1 + 1530, Cost: 1)    evalfoo01(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoo1(ar_0, ar_1, ar_3, ar_3)) [ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 ]

		(Comp: 6*ar_1 + 1530, Cost: 1)    evalfoo00(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalVERIFIERnondetintstart(ar_0, ar_1, ar_2, ar_3)) [ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 ]

		(Comp: 6*ar_1 + 1530, Cost: 1)    evalfoobb2in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoo0(ar_0, ar_1, ar_2, ar_3)) [ -ar_1 + 254 >= 0 /\ ar_0 - ar_1 >= 0 /\ -ar_0 - ar_1 + 508 >= 0 /\ -ar_0 + 254 >= 0 ]

		(Comp: 2, Cost: 1)                evalfoobb1in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb3in(ar_0, ar_1, ar_2, ar_3)) [ ar_0 - ar_1 >= 0 /\ ar_0 >= 255 ]

		(Comp: 6*ar_1 + 1530, Cost: 1)    evalfoobb1in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb2in(ar_0, ar_1, ar_2, ar_3)) [ ar_0 - ar_1 >= 0 /\ 254 >= ar_0 ]

		(Comp: 1, Cost: 1)                evalfoobb0in(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb1in(ar_1, ar_1, ar_2, ar_3))

		(Comp: 1, Cost: 1)                evalfoostart(ar_0, ar_1, ar_2, ar_3) -> Com_1(evalfoobb0in(ar_0, ar_1, ar_2, ar_3))

	start location:	koat_start

	leaf cost:	0



Complexity upper bound 48*ar_1 + 12246



Time: 0.341 sec (SMT: 0.293 sec)


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(2)
BOUNDS(1, n^1)