I am trying to prove an inductive fact in Z3, an SMT solver by Microsoft. I know that Z3 does not provide this functionality in general, as explained in the Z3 guide (section 8: Datatypes), but it looks like this is possible when we constrain the domain over which we want to prove the fact. Consider the following example:

```
(declare-fun p (Int) Bool)
(assert (p 0))
(assert (forall ((x Int))
(=>
(and (> x 0) (<= x 20))
(= (p (- x 1)) (p x) ))))
(assert (not (p 20)))
(check-sat)
```

The solver responds correctly with `unsat`

, which means that `(p 20)`

is valid. The problem is that when we relax this constraint any further (we replace `20`

in the previous example by any integer greater than 20), the solver responds with `unknown`

.

I find this strange because it does not take Z3 long to solve the original problem, but when we increase the upper limit by one it becomes suddenly impossible. I have tried to add a pattern to the quantifier as follows:

```
(declare-fun p (Int) Bool)
(assert (p 0))
(assert (forall ((x Int))
(! (=>
(and (> x 0) (<= x 40))
(= (p (- x 1)) (p x) )) :pattern ((<= x 40)))))
(assert (not (p 40)))
(check-sat)
```

Which seems to work better, but now the upper limit is 40. Does this mean that I can better not use Z3 to prove such facts, or am I formulating my problem incorrectly?