In this paper (Section 3.2), it says that z3 applies rewriting/simplification of formulas before it does any other steps.

Suppose I have a formula in `QF_UF`

, that consists of multiple `assert`

statements. Is there any rewriting rule that would somehow "break the barrier" between different assert statements? Or, asking the other way round: Can I be sure that rewrite rules are only applied locally, "within" one assert statement?

For example, consider the following formula:

```
(set-logic QF_UF)
(set-option :auto-config false)
(set-option :PROOF_MODE 2)
(declare-fun a () Bool)
(assert a)
(assert (not a))
(check-sat)
(get-proof)
```

Can I be sure that the proof will contain a resolution step to prove `False`

, or is it possible that `False`

will be concluded by a rewrite/simplification step?

The reason I am asking is that for my application, every `assert`

statement has a special semantics. Rewriting/Simplification across several `assert`

statements would render the resulting proof of unsatisfiability unusable (or at least: very hard to use) for me.