I've the following SMT-Lib2 script:

```
(set-option :produce-models true)
(declare-fun s0 () Int)
(declare-fun table0 (Int) (_ BitVec 8))
(assert (= (table0 0) #x00))
(assert
(let ((s3 (ite (or (< s0 0) (<= 1 s0)) #x01 (table0 s0))))
(let ((s5 (ite (bvuge s3 #x02) #b1 #b0)))
(= s5 #b1))))
(check-sat)
(get-model)
```

With Z3 v3.2 running on the Mac, I get:

```
sat
(model
;; universe for (_ BitVec 8):
;; bv!val!2 bv!val!3 bv!val!0 bv!val!1
;; -----------
;; definitions for universe elements:
(declare-fun bv!val!2 () (_ BitVec 8))
(declare-fun bv!val!3 () (_ BitVec 8))
(declare-fun bv!val!0 () (_ BitVec 8))
(declare-fun bv!val!1 () (_ BitVec 8))
;; cardinality constraint:
(forall ((x (_ BitVec 8)))
(and (= x bv!val!2) (= x bv!val!3) (= x bv!val!0) (= x bv!val!1)))
;; -----------
(define-fun s0 () Int
(- 1))
(define-fun table0 ((x!1 Int)) (_ BitVec 8)
(ite (= x!1 0) bv!val!0
(ite (= x!1 (- 1)) bv!val!3
bv!val!0)))
)
```

Which states that s0 = -1 is a model. However, with s0 = -1, we have s3 = 1 and s5 = #b0, which makes the assertion false. In fact, I'm quite sure the benchmark as stated is unsatisfiable.

One thing I noticed in the Z3 output is the quantified formula it gives for the cardinality constraint. It says:

```
;; cardinality constraint:
(forall ((x (_ BitVec 8)))
(and (= x bv!val!2) (= x bv!val!3) (= x bv!val!0) (= x bv!val!1)))
```

The assertion is a conjunction, which sounds rather weird; shouldn't that be a disjunction? I'm not sure if this is the root-cause of the problem, but it sure sounds fishy.