# Exclusion and inclusion in Z3

I am trying to model inclusion and exclusion of elements in sets with Z3. In particular inclusion of elements with distinct values, and exclusion of elements not already in a target set. So basically I want to have a set U and have Z3 find a set U_d that only contains elements of U with distinct values.

My current approach uses quantifiers, but I'm having trouble understanding how to state that I want to always include elements in U_d if they appear in U.

``````( set-option :produce-models true)

;;; Two simple sorts.
;;; Sets and Zs.

( declare-sort Z   0 )
( declare-sort Set 0 )

;;; A set can contain a Z or not.
;;; Zs can have a value.

( declare-fun contains (Set Z) bool )
( declare-fun value (Z) Int )

;;; Two sets and two Z instances for use in the example.

( declare-const set Set )
( declare-const distinct_set Set )

( declare-const A Z )
( declare-const B Z )

;;; The elements and sets are distinct.

( assert ( distinct A B ) )
( assert ( distinct set distinct_set ) )

;;; Set 'set' contains A but not B

( assert ( = ( contains set A ) true ) )
( assert ( = ( contains set B ) false ) )

;;; Assert that all elements contained by distinct_set have different values unless they're the same variable.
( assert
( forall ( (x Z) (y Z) )
( =>
( and
( contains distinct_set x )
( contains distinct_set y )
( = ( value x ) ( value y ) ) )
( = x y ) )))

;;; distinct_set can contain only elements that appear in set.
;;; In other words, distinct_set is a proper set.
( assert
( forall ( ( x Z ) )
( =>
( contains distinct_set x )
( contains set x ))))

;;; Give elements some values.
( assert ( = (value A) 0 ) )
( assert ( = (value B) 1 ) )

( push )
( check-sat )
( get-value (( contains distinct_set A )))
( get-value (( contains distinct_set B )))
( pop )
``````

The assignments it produces are:

``````sat
((( contains distinct_set A ) false))
((( contains distinct_set B ) false))
``````

The assignments I would like are:

``````sat
((( contains distinct_set A ) true))
((( contains distinct_set B ) false))
``````

I understand that an assignment of false to both A and B is a logically correct assignment, but I don't know how to state things in such a way as to rule those sorts of cases out.

Perhaps I'm not thinking about the problem correctly.

Any advice would be much appreciated. :)

-

What do you think of the following assertion?

``````(assert
(forall ((x Z))
(=> (contains set x)
(exists ((y Z))
(and (= (value x) (value y))
(contains set y)
(contains distinct_set y))))))
``````

It says that for every element `x` of `set` (i.e., U), there is a `y` s.t.

• value of `y` is equal to value of `x`
• `y` is also an element of `set`
• `y` is an element of `distinct_set` (i.e., U_d)

This assertion makes sure that if there are two elements in `set` with the same value, then one and only one of them is an element of `distinct_set`. Is that what you want?

Note that, if we just add this assertion, Z3 will still produce a model where

``````((( contains distinct_set A ) false))
((( contains distinct_set B ) false))
``````

If we inspect the model produced by Z3 using `(get-model)`, we will notice that `set` contains another element different from `A`. So, to force `set` to contain only the element `A`, we have to assert

``````(assert
(forall ((x Z))
(= (contains set x) (= x A))))
``````

After you add this assertion, the following two assertions become redundant:

``````( assert ( = ( contains set A ) true ) )
( assert ( = ( contains set B ) false ) )
``````

Now, let us consider the case where `set` contains two values: `A` and `C`, and they both have the same value. The following script also asks questions such as: is there a model where

• `distinct_set` does not contain `A`

• `distinct_set` does not contain `A` nor `C`

• `distinct_set` contains `A` and `C`

Script:

``````( set-option :produce-models true)

;;; Two simple sorts.
;;; Sets and Zs.

( declare-sort Z   0 )
( declare-sort Set 0 )

;;; A set can contain a Z or not.
;;; Zs can have a value.

( declare-fun contains (Set Z) bool )
( declare-fun value (Z) Int )

;;; Two sets and two Z instances for use in the example.

( declare-const set Set )
( declare-const distinct_set Set )

( declare-const A Z )
( declare-const B Z )
( declare-const C Z )

;;; The elements and sets are distinct.

( assert ( distinct A B C) )
( assert ( distinct set distinct_set ) )

;;; set contains only A and C
(assert
(forall ((x Z))
(= (contains set x) (or (= x A) (= x C)))))

;;; Assert that all elements contained by distinct_set have different values unless they're the same variable.
( assert
( forall ( (x Z) (y Z) )
( =>
( and
( contains distinct_set x )
( contains distinct_set y )
( = ( value x ) ( value y ) ) )
( = x y ) )))

;;; distinct_set can contain only elements that appear in set.
;;; In other words, distinct_set is a proper set.
( assert
( forall ( ( x Z ) )
( =>
( contains distinct_set x )
( contains set x ))))

;;; Give elements some values.
( assert ( = (value A) 0 ) )
( assert ( = (value B) 1 ) )
( assert ( = (value C) 0 ) )

(assert
(forall ((x Z))
(=> (contains set x)
(exists ((y Z))
(and (= (value x) (value y))
(contains set y)
(contains distinct_set y))))))

( push )
( check-sat )
( get-model )
( get-value (( contains distinct_set A )))
( get-value (( contains distinct_set B )))
( get-value (( contains distinct_set C )))
( echo "Is there another model where A is not in distinct_set")
( assert (not ( contains distinct_set A )))
(check-sat)
( get-value (( contains distinct_set A )))
( get-value (( contains distinct_set B )))
( get-value (( contains distinct_set C )))
( echo "Is there another model where A and C are not in distinct_set")
( assert (not ( contains distinct_set C )))
(check-sat)
( pop ) ;; retracting the last two assertions
( push )
( echo "Is there a model where A and C are in distinct_set")
( assert ( contains distinct_set A ))
( assert ( contains distinct_set C ))
( check-sat )
``````
-
That assertion seems to be exactly what I was looking for, thank you. Also, if I understand correctly, it also makes the assertion I had for ensuring 'distinct_set' only contains elements in 'set' redundant. I like it. :) –  Mintish Mar 15 '12 at 7:10