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. :)