I have this problem in Common Lisp. I need to manipulate existential variables introducing the rule of skolemization.
For example I need to buid a function which turns
(exist ?x (p ?x)) in
sk00042 is a variable. Note that this function becomes a bit harder when universal variables are involved.
For example, the function given the expression
(forall ?y (exist ?x (p ?x ?y)) turns it into
(forall ?y (p (sf666 ?y) ?y).
The idea is that the existencial variable tells me that there is something that satisfies the formulae. If this existential quantifier is the outer , then this quantifier does not depend on anything and the variable
?x in the first example above should be replaced with the constant
skoo42 which is generated by this function :
(defun skolem-variable () (gentemp "SV-")).
If the harder (second) case takes place and there's a universal quantifier "out" of the existential one, then that something that exists depends on variables universally quantified, meaning that the function must take care of this dependence and the universal variables become incorporated in the constant, like in the example :
(forall ?y (exist ?x (p ?x ?y)) ---->
(forall ?y (p (sf666 ?y) ?y)
For this also serves the function:
(defun skolem-function* (&rest args) (cons (gentemp "SF-") args)) (defun skolem-function (args) (apply #'skolem-function* args))
Here are some examples to get more familiar with the idea :
(skolemize '(forall ?y (exist ?x (p ?x ?y)))) ;=> (forall ?y (P (SF-1 ?Y) ?Y)) (skolemize '(exist ?y (forall ?x (p ?x ?y)))) ;=> (for all ?x (P ?X SV-2) (skolemize '(exist ?y (and (p ?x) (f ?y)))) ;=> (AND (P ?X) (F SV-4)) (skolemize '(forall ?x (exist ?y (and (p ?x) (f ?y))))) ;=> (forall ?x (AND (P ?X) (F (SF-5 ?X)))
I need to build the function (using
skolem-function above) that given
an expression controls if the outer is exist, then replaces the variable with skolem-variable. If the outer is a forall followed by and exist, the function does what i've explained above.