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Given non-negative real number tSS, tLS, tIS, tBS. (i.e. they are real type with tSS>=0 and tLS>=0 and tIS>=0 and tBS>=0 and tSS>=0)

The following contraint C1 is in CNF format that contains 12 conjuncts.

(tSS+tLS<=tIS)And(tIS<=tBS)And(tSS+tLS+tIS+tBS<=3) OR
(tSS+tLS<=tBS)And(tBS<=tIS)And(tSS+tLS+tIS+tBS<=3) OR
(tSS+tLS<=tBS)And(tSS<=tIS)And(tIS<=tSS+tLS)And(tSS+tLS+tIS+tBS<=3) OR
(tSS<=tIS)And(tIS<=tBS)And(tBS<=tSS+tLS)And(tSS+tLS+tIS+tBS<=3) OR
(tSS+tLS<=tIS)And(tSS<=tBS)And(tBS<=tSS+tLS)And(tSS+tLS+tIS+tBS<=3) OR
(tSS<=tBS)And(tBS<=tIS)And(tIS<=tSS+tLS)And(tSS+tLS+tIS+tBS<=3) OR
(tSS+tLS<=tBS)And(tIS<=tSS)And(tSS+tLS+tIS+tBS<=3) OR
(tSS<=tBS)And(tIS<=tBS)And(tBS<=tSS+tLS)And(tSS+tLS+tIS+tBS<=3) OR
(tIS<=tBS)And(tBS<=tSS)And(tSS+tLS+tIS+tBS<=3) OR
(tSS+tLS<=tIS)And(tBS<=tSS)And(tSS+tLS+tIS+tBS<=3) OR
(tSS<=tIS)And(tBS<=tSS)And(tIS<=tSS+tLS)And(tSS+tLS+tIS+tBS<=3) OR

I wish to obtain the constraint C2 in the form of

tSS<=a and tLS<=b and tIS<=c and tBS <=d and tSS<=e

The constraint C2 only needs to be included in C1, i.e. any valuation satisfies C2 must satisfies C1, but not vice versa. The value of a-e, is value that ranges from 0 to infinity. Infinity means that it can take any value larger than 0.

Is it possible to use Z3 to infer the value of a-e? (it can be unsatisfiable)

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1 Answer 1

up vote 2 down vote accepted

There may be more efficient techniques to do it but at least you can solve the problem using quantifiers.

Let C1(tSS, tLS, tIS, tBS) denote the CNF formula and C2(SS, tLS, tIS, tBS, a, b, c, d) is the constraint to satisfy. You can check for satisfiability of the following quantified formula:

forall tSS tLS tIS tBS. C2(SS, tLS, tIS, tBS, a, b, c, d) => C1(tSS, tLS, tIS, tBS)

where a, b, c, d are free variables.

I encoded your concrete example using Z3 SMT online. The query is unsatisfiable in this case.

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But tSS+tLS+tIS+tBS<=3 is an inequality for every conjuncts, therefore take tSS=4, tLS=4, tIS=4, and tBS=4 seems will make the inequality false. I am not sure why the result is a = b = c = d = 4.0? –  william007 Sep 1 '12 at 15:36
Sorry, I didn't read the question carefully. I updated the answer and the link accordingly. –  pad Sep 1 '12 at 18:38

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