我是一个与Z3合作的新人。
想知道我如何计算一组和两组不同的最大值。
例如:
[1, 6, 5] - 更大的是6
[1, 6, 5] e [10, 7, 2] - 大于6
我使用以下代码进行设置:
(declare-sort Set 0)
(declare-fun contains (Set Int) bool)
( declare-const set Set )
( declare-const distinct_set Set )
( declare-const A Int )
( declare-const B Int )
( declare-const C Int )
( assert ( = A 0 ) )
( assert ( = B 1 ) )
( assert ( = C 2 ) )
( assert ( distinct A C) )
( assert ( distinct set distinct_set ) )
(assert
(forall ((x Int))
(= (contains set x) (or (= x A) (= x C)))))
现在想知道如何计算集合(集合)中的最大值和集合中的最大值(set和distinct_set)。
如果是全部整数只是因为它很容易做到:
(define-fun max ((x Int) (y Int)) Int
(ite (< x y) y x))
但是我不能通过整数离开集合,即获取已经设置的值。
你能帮助我吗?
由于
答案 0 :(得分:4)
以下编码是否适用于您的目的?它也可以在线here。
; We Enconde each set S of integers as a function S : Int -> Bool
(declare-fun S1 (Int) Bool)
; To assert that A and C are elements of S1, we just assert (S1 A) and (S1 C)
(declare-const A Int)
(declare-const C Int)
(assert (S1 A))
(assert (S1 C))
; To say that B is not an element of S1, we just assert (not (S1 B))
(declare-const B Int)
(assert (not (S1 B)))
; Now, let max_S1 be the max value in S1
(declare-const max_S1 Int)
; Then, we now that max_S1 is an element of S1, that is
(assert (S1 max_S1))
; All elements in S1 are smaller than or equal to max_S1
(assert (forall ((x Int)) (=> (S1 x) (not (>= x (+ max_S1 1))))))
; Now, let us define a set S2 and S3
(declare-fun S2 (Int) Bool)
(declare-fun S3 (Int) Bool)
; To assert that S3 is equal to the union of S1 and S2, we just assert
(assert (forall ((x Int)) (= (S3 x) (or (S1 x) (S2 x)))))
; To assert that S3 is not equal to S1 we assert
(assert (exists ((x Int)) (not (= (S3 x) (S1 x)))))
(check-sat)
; Now let max_S3 be the maximal value of S3
(declare-const max_S3 Int)
(assert (S3 max_S3))
(assert (forall ((x Int)) (=> (S3 x) (not (>= x (+ max_S3 1))))))
; the set of constraints is still satisfiable
(check-sat)
; Now, let us assert that max_S3 < max_S1.
; It should be unsat, since S3 is a super set of S1
(assert (< max_S3 max_S1))
(check-sat)