The operation `(contains S1 S2)`

that you describe in your message is the subset relation. If we encode sets of integers as functions from Int to Boolean (like in: max value in set z3), then `S1`

and `S2`

are declared as:

```
(declare-fun S1 (Int) Bool)
(declare-fun S2 (Int) Bool)
```

Then, we can say that `S1`

is a subset of `S2`

by asserting

```
(assert (forall ((x Int)) (=> (S1 x) (S2 x))))
```

We just saying that any element in `S1`

is also an element of `S2`

.

**EDIT**

We can use the expression `(exists ((x Int)) (and (S1 x) (S2 x)))`

to check whether the sets `S1`

and `S2`

have an element in common or not

**END EDIT**

The minimal element of a set can be encoded as we did in max value in set z3.
For example, suppose the minimal element of `S1`

is `min_S1`

.

```
; Now, let min_S1 be the min value in S1
(declare-const min_S1 Int)
; Then, we now that min_S1 is an element of S1, that is
(assert (S1 min_S1))
; All elements in S1 are bigger than or equal to min_S1
(assert (forall ((x Int)) (=> (S1 x) (not (<= x (- min_S1 1))))))
```

If the minimal values of the sets you are encoding are known at "encoding time" (and are small). We can use yet another encoding based on Bit-vectors.
In this encoding, a set is a Bit-vector. If the sets only contain values between 0 and 5, then we can use a Bit-vector of size 6. The idea is: if bit `i`

is true iff `i`

is an element of the set.

Here is an example with the main operation:

```
(declare-const S1 (_ BitVec 6))
(declare-const S2 (_ BitVec 6))
(declare-const S3 (_ BitVec 6))
; set equality is just bit-vector equality
(assert (= S1 S2))
; set intersection, union, and complement are encoded using bit-wise operations
; S3 is S1 union S2
(assert (= S3 (bvor S1 S2)))
; S3 is S1 intersection of S2
(assert (= S3 (bvand S1 S2)))
; S3 is the complement of S1
(assert (= S3 (bvnot S1)))
; S1 is a subset of S2 if S1 = (S1 intersection S2), that is
(assert (= S1 (bvand S1 S2)))
; S1 is the empty set if it is the 0 bit-vector
(assert (= S1 #b000000))
; To build a set that contains only i we can use the left shift
; Here, we assume that i is also a bit-vector
(declare-const i (_ BitVec 6))
; S1 is the set that contains only i
; We are also assuming that i is a value in [0, 5]
(assert (= S1 (bvshl #b000001 i)))
```