# Kleisli composition using Arrays in Z3?

Some questions from a Z3 newbie. We've been encoding the semantics of programs in a domain-specific language into SMT. Each expression in our language denotes a function,

``````T -> T Set
``````

and semantics of sequential composition operator is standard Kleisli composition. That is, given functions `f` and `g` we first lift g to a function of type

``````T Set -> T Set
``````

in the obvious way (by applying it to the input element-wise, and taking the union of the results) and then compose f and this lifted version of g.

How might we encode this using Z3? For concreteness, suppose that `T` is `Int`. We might start like this:

``````(define-sort Set () (Array Int Int))
(define-fun set_empty () Set ((as const Set) (- 0 1)))
(define-fun set_mem ((x Int) (s Set)) Bool (>= (select s x) 0))
``````

Note that I've encoded a set not as `Array Int Bool` as suggested in the Z3 Tutorial (http://rise4fun.com/z3/tutorialcontent/guide#h26) but as `Array Int Int` so I can map over the elements below. By convention, `-1` indicates a value not in the set. One could also use an optional type I suppose.

Next let's define two functions `f` and `g`,

``````(declare-fun f (Int) Set)
(declare-fun g (Int) Set)
(assert (forall ((x Int)) (= (set_add (+ x 1) set_empty) (f x))))
(assert (forall ((x Int)) (= (set_add (+ x 1) (set_add (+ x 2) set_empty)) (g x))))
``````

as well as the lifted version of `g`:

``````(define-sort DblSet () (Array Int Set))
(declare-fun g_lifted (Set) DblSet)
(assert (forall ((s1 Set)) (= ((_ map g) s1) (g_lifted s1))))
``````

Note though I have to define a new type `DblSet` to represent sets of sets. Then I can define the Kleisli composition of `f` and `g`.

``````(declare-fun f_seq_g (Int) DblSet)
(assert (forall ((x Int)) (= (g_lifted (f x)) (f_seq_g x))))
``````

Questions:

• I think I can live with this, but it is extremely ugly. In particular, the type of the encoded term depends on the number of sequential compositions in the source program. Is there a better way to do all of this? If I could encode the `flatten` operator,

`````` DblSet -> Set
``````

then the encoding would be much simpler and would yield terms of a uniform type. But alas, I don't see how to do this using `const` and `map` (at least, without asserting a formula with lots of quantifiers).

• I was careful to not `define-fun` each function, but `declare-fun` it and then `assert` what it computes. The reason is to avoid the following error message:

``````invalid function declaration reference, named expressions (aka macros) cannot be referenced
``````

(This is the same question as Matthew asks here: mapping user-defined functions in z3)

Thanks!

-N

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