Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I am experimenting with optimizing the use of Z3 for proving facts about a first-order theory. Currently, I specify a first-order theory in Python, ground the quantifiers there and send all the clauses along with the negation of the proof goal to Z3. I have the following idea that I hope could optimize the outcome: I only want to send the formulas in the theory to Z3 that are relevant to the proof goal. I will not discuss this concept in detail, but I think the intuition is simple: my theory is a conjunction of formulas, and I only want to send conjuncts that can possibly affect the truth value of the proof goal.

My question is the following: can this lead to an improvement in efficiency, or does Z3 already use a similar method? I would guess not, because I don't think that Z3 always assumes that the last assertion is the proof goal, so it has no way of optimizing this.

share|improve this question

1 Answer 1

up vote 2 down vote accepted

Yes, removing irrelevant facts can make a big difference. Suppose that we have a unsatisfiable formula of the form F_1 and F_2 and (not G). Moreover, let us assume that F_1 and (not G) is unsatisfiable, and F_2 is satisfiable. F_2 is what you call irrelevant. If there is a cheap way to remove F_2 before sending the formulat to Z3, it will probable make a big difference.

Z3 has heuristics for "ignoring" irrelevant facts, but they are just heuristics. For our example, the worst case scenario is a F_2 that is really hard for Z3 to satisfy. Z3 is essentially trying to build an interpretation/solution that satisfies the input formula (the formula F_1 an F_2 and (not G) in our working example). A formula is unsatisfiable when Z3 can show it is impossible to build the interpretation. In practice, the formula F_2 is irrelevant for Z3 only if it can quickly show it to be satisfiable, and the interpretation/solution for F_2 does not conflicts F_1 and (not G). If that is not the case, Z3 can waste a lot of resources with F_2.

share|improve this answer
    
The unsat core would leave out F_2, yes? Obviously you get that after the fact (too late for OP, as written), but it may be useful for back-jumping for the caller of the SMT if these formulas are the result of a search. –  GManNickG Dec 21 '12 at 23:57
    
Yes, a minimal unsat core would leave out F_2. However, we have to keep in mind that, in practice, "computing minimal unsat cores" is more expensive than "computing unsat cores" which is more expensive than "just checking satisfiability". –  Leonardo de Moura Dec 22 '12 at 0:21

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.