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I have some simple constraints involving multiplication of reals in z3 that are producing unknown. The problem seems to be that they are wrapped in a datatype, as the unwrapped version produces sat.

Here is a simplified case:

(declare-datatypes () ((T (NUM (n Real)))))

(declare-const a T)
(declare-const b T)
(declare-const c T)

(assert (is-NUM a))
(assert (is-NUM b))
(assert (is-NUM c))

(assert (= c (NUM (* (n a) (n b)))))


And without the datatype:

(declare-const a Real)
(declare-const b Real)
(declare-const c Real)

(assert (= c (* a b)))


I'm using z3 3.2, but this also is reproducible in the web interface.

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2 Answers 2

up vote 4 down vote accepted

Yes, Z3 can return unknown in quantifier-free problems. Here are the main reasons:

  • Run out of time or memory

  • The quantifier-free fragment is undecidable (e.g., nonlinear integer arithmetic)

  • The quantifier-free fragment is too expensive, and/or the procedure implemented in Z3 is incomplete.

Your problems are in a decidable fragment, and the unknown is due to the incomplete procedure for nonlinear arithmetic used in Z3. Z3 4.0 has a complete procedure for nonlinear real arithmetic, but it is still not integrated with the other theories. So, it will not help in the first problem.

The different in behavior in the first and second queries is due to different strategies used for each query. Z3 has a new framework for defining custom strategies. You can get sat for the first query by using the command

(check-sat-using (then simplify solve-eqs smt))

instead of


The first command forces Z3 to eliminate variables by solving equalities (i.e., tactic solve-eqs). It will eliminate the equality (= c (NUM (* (n a) (n b)))). This tactic is automatically used in the second problem in Z3 3.x. Note that this tactic will not help if we replace the equality with (>= c (NUM (* (n a) (n b)))).

Moreover, the second problem contains only nonlinear arithmetic. So, in Z3 4.0, the new (and complete) solver for nonlinear real arithmetic will be automatically used.

You can learn about the new strategy framework at,

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Thanks @Leonardo, upgrading to z3 4.0 and using the strategies you suggested worked well. – Jonah Kagan Jun 26 '12 at 22:19

Your examples are in non-linear arithmetic. Z3 4.0 is able to solve problems with only non-linear arithmetic assertions, but not along with uninterpreted functions and other theories. That explains why it produces unknown in the first example. This limitation is likely to be addressed in Z3's future versions.

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