# What does the bitwise negation operator(\) do in prolog?

I have to implement some functions, one of which is f= ~p/\~q.

I have the following :

``````p(a). p(b).
q(a). q(b). q(c).
``````

I found the function as:

``````f(X):-p(\X);q(\X).
``````

When I verify it ( f(X). , f(a). , f(b). , f(c). ) it always returns false.

Shouldn't it return true for c since c is not of type p?

Thank you!

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It's not bitwise negation. It's bitwise COMPLEMENT. `f(a)` returns false, for example, because, as @false points out in his answer, the backslash in this context is acting like an uninterpreted functor. So neither `p(\a)` is a fact, nor is `q(\a)`. Therefore, `p(\a) ; q(\a)` fails. For backslash to do bitwise complement, it must be used with `is/2` or a numeric comparator, e.g., `X = 1, Y is \X.` yields `Y = -2` (using @false's example), since `1` is `00000001` in hex and `-2` is `FFFFFFFE` in hex (assuming 32-bit words). –  mbratch Feb 24 at 0:38
@mbratch: Assuming 2s complement. –  false Feb 24 at 1:05
@false yes, sorry, I should have mentioned. –  mbratch Feb 24 at 1:19

`(\)/1` is an evaluable functor for bitwise complement. If you use it directly in an argument, it is only an uninterpreted functor. Evaluation is only performed with `(is)/2`, `>/2` and other comparison operators.

In all current Prolog implementations you get:

``````?- X is \ 1.
X = -2.
``````

Fine print: An ISO conforming system is free to define the value for `\`. That is, it is free, whether it uses 2's complement or another representation. However, there are only systems that use 2's complement.

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So the function implementation is correct? –  Slim_Shady Feb 24 at 0:34
@Slim_Shady: It is the bitwise complement with 2s complement. –  false Feb 24 at 0:41
@Slim_Shady: no, your function isn't correct –  CapelliC Feb 24 at 8:13

Your implementation of that formula seems flawed.

You are required about `f : (not p) and (not q)`

A restricted negation is available in Prolog, using operator `(\+)/1`, and conjunction (X and Y) is expressed by comma i.e. `(,)/2`.

Semicolon i.e. `(;)/2` means `or`, as for instance in the following test, that shows your initial assumption about `f(c)` is also wrong.

``````?- forall(member(X,[a,b,c,d]),(f(X)->writeln(y);writeln(n))).
n
n
n
y
``````

(of course, after f/1 has been translated correctly)

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the not(...) implementation is what I initially did..and it worked as one would expect.. but my teacher said it was not good.. that I should replace `not(p(X))` with `p(\X)`. Thank you for the explanation though! –  Slim_Shady Feb 24 at 18:44
I don't understand... You cannot apply \ operator to an atom. Then you should reify both p/1 and q/1. Totally useless. –  CapelliC Feb 24 at 18:50