unsat
(instantiations (forall ((x Int)) (= x (g1 x)))
  ( (u1 (+ (- 1) (h1 (+ 1 sk2x))) 3 2) )
)
(instantiations (forall ((x Int)) (= x (h1 x)))
  ( (+ 1 sk2x) )
  ( sk2x )
  ( 0 )
)
(instantiations (forall ((x Int) (y Int)) (= x (+ (* (- 1) y) (f0 x y))))
  ( (u0 (+ (- 1) (h0 (+ 1 sk2x))) 1 1) (v0 (+ (- 1) (h0 (+ 1 sk2x))) 1 1) )
  ( (u0 (+ (- 2) (h0 (+ 1 sk2x))) 1 1) (v0 (+ (- 2) (h0 (+ 1 sk2x))) 1 1) )
)
(instantiations (forall ((x Int)) (= x (+ (- 2) (g0 x))))
  ( (u0 (+ (- 1) (h0 (+ 1 sk2x))) 1 1) )
  ( (u0 (+ (- 2) (h0 (+ 1 sk2x))) 1 1) )
)
(instantiations (forall ((x Int)) (= (h0 x) (* 2 x)))
  ( sk2x )
  ( (+ 1 sk2x) )
  ( 0 )
)
(instantiations (forall ((x Int) (y Int)) (= y (+ (* 3 x) (* (- 1) (f1 x y)))))
  ( (u1 (+ (- 1) (h1 (+ 1 sk2x))) 3 2) (v1 (+ (- 1) (h1 (+ 1 sk2x))) 3 2) )
)
(instantiations (forall ((x Int) (y Int) (z Int)) (= (u0 x y z) (ite (>= x 1) (f0 (u0 (+ (- 1) x) y z) (v0 (+ (- 1) x) y z)) y)))
  ( (h0 (+ 1 sk2x)) 1 1 )
  ( (+ (- 1) (h0 (+ 1 sk2x))) 1 1 )
  ( (h0 0) 1 1 )
)
(instantiations (forall ((x Int) (y Int) (z Int)) (= (v0 x y z) (ite (>= x 1) (g0 (u0 (+ (- 1) x) y z)) z)))
  ( (h0 (+ 1 sk2x)) 1 1 )
  ( (+ (- 1) (h0 (+ 1 sk2x))) 1 1 )
  ( (h0 0) 1 1 )
)
(instantiations (forall ((x Int) (y Int) (z Int)) (= (u1 x y z) (ite (>= x 1) (f1 (u1 (+ (- 1) x) y z) (v1 (+ (- 1) x) y z)) y)))
  ( (h1 (+ 1 sk2x)) 3 2 )
  ( (h1 0) 3 2 )
)
(instantiations (forall ((x Int) (y Int) (z Int)) (= (v1 x y z) (ite (>= x 1) (g1 (u1 (+ (- 1) x) y z)) z)))
  ( (h1 (+ 1 sk2x)) 3 2 )
  ( (h1 0) 3 2 )
)
(instantiations (forall ((x Int)) (= (small x) (* 7 (w0 x))))
  ( skcj )
)
(instantiations (forall ((x Int)) (= (fast x) (+ (- 14) (* 7 (w1 x)))))
  ( skcj )
)
(instantiations (forall ((x Int)) (= (w0 x) (u0 (h0 x) 1 1)))
  ( sk2x )
  ( (+ 1 sk2x) )
  ( 0 )
)
(instantiations (forall ((x Int)) (= (w1 x) (u1 (h1 x) 3 2)))
  ( sk2x )
  ( (+ 1 sk2x) )
  ( 0 )
)
(instantiations (forall ((x Int)) (= (s1 x) (v1 (h1 x) 3 2)))
  ( (+ 1 sk2x) )
  ( sk2x )
  ( 0 )
)
(instantiations (forall ((x Int)) (or (not (>= x 0)) (and (= (w0 x) (+ (- 2) (w1 x))) (= (w0 x) (+ (- 2) (s1 x) (v0 (h0 x) 1 1))))))
  ( skcj )
)
