# Unification of expanded terms, double negation

I need to introduce a predicate that will let me negate atoms. So far I have `neg(Premise) :- \+ Premise.`, which gives me following results:

``````?- assert(a).
true.

?- a.
true.

?- neg(a).
false.

?- neg(neg(a)).
true.
``````

That makes sense and all is dandy, until I tried unification. For instance

`[a,_] = [a,123].` returns `true.`

while

`[a,_] = [neg(neg(a)),123].` returns `false.`.

How can I solve this so that the `neg(neg(X))` part is being evaluated or otherwise unified with `X` (since they both are logically equivalent)? So basically, I need `X=neg(a), a=neg(X).` to succeed.

Edit I found an explanation as to why `not(not(<expression>))` is not equivalent to `<expression>` in prolog. Since `<expression>` succeeds, `not(<expression>)` fails. When a goal fails the variables it instantiated get uninstantiated. (source, slide 14).

I'm still not sure how to get around this though.

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Prolog isn't executing a predicate like a function and returning a result. It instantiates uninstantiated variables where possible and checks for truth value. So `neg(neg(a))` isn't doing what you might think. It's instantiating `Premise` with `neg(a)` and then evaluating `\+ neg(a).` ultimately determining the truth value of `neg` with `neg(a)` given as a term. Your array example attempts to unify `a` with `neg(neg(a))` and fails because they are both fully instantiated terms that don't match. You'll need to be more clear on what you're trying to do in order to 'get around it'. –  lurker Nov 5 '13 at 17:58
@mbratch I see. Basically what I want is: if `l(a).` holds, then `l(neg(neg(a)).` should succeed too. Does that make sense? –  0sh Nov 5 '13 at 18:11
Yes. You want a predicate that says, `l(neg(neg(X))) :- l(X).` –  lurker Nov 5 '13 at 18:15
@mbratch and if I want that to hold for all predicates? Copy & paste and substitute `l` for each predicate seems like not the most efficient solution. –  0sh Nov 5 '13 at 18:20
Indeed, if you are looking for a general solution, that wouldn't be efficient. I'm a little curious as to what's driving the scenario to be so prevalent. Some refactoring may be necessary. –  lurker Nov 5 '13 at 18:26

Reification of truth value will work on your simple case:

``````4 ?- [user].
|: reify(P, V) :- call(P) -> V = 1 ; V = 0.
% user://1 compiled 0.03 sec, 2 clauses
true.

5 ?- reify(true, V), reify(\+ \+ true, U), V = U.
V = U, U = 1.
``````

``````6 ?- [user].
|: a.
|: neg(P) :- \+ P.
% user://2 compiled 0.02 sec, 3 clauses
true.

7 ?- reify(a, V), reify(neg(neg(a)), U), V = U.
V = U, U = 1.
``````

not sure how well this will merge with your code.

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