# Solving CNF using Prolog

While learning Prolog, I tried to write a program solving CNF problem (the performance is not an issue), so I ended up with the following code to solve `(!x||y||!z)&&(x||!y||z)&&(x||y||z)&&(!x||!y||z)`:

``````vx(t).
vx(f).
vy(t).
vy(f).
vz(t).
vz(f).

x(X) :- X=t; \+ X=f.
y(Y) :- Y=t; \+ Y=f.
z(Z) :- Z=t; \+ Z=f.
nx(X) :- X=f; \+ X=t.
ny(Y) :- Y=f; \+ Y=t.
nz(Z) :- Z=f; \+ Z=t.

cnf :- (nx(X); y(Y); nz(Z)), (x(X); ny(Y); z(Z)), (x(X); y(Y); z(Z)), (nx(X); ny(Y); z(Z)), write(X), write(Y), write(Z).
``````

Is there any simpler and more direct way to solve CNF using this declarative language?

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## 2 Answers

Consider using the built-in predicates "true" and "false" directly, and use the toplevel to display results (independently, instead of several subsequent write/1 calls, consider using format/2):

``````boolean(true).
boolean(false).

cnf(X, Y, Z) :-
maplist(boolean, [X,Y,Z]),
(\+ X; Y ; \+ Z),
(   X ; \+ Y ; Z),
(   X ; Y ; Z),
(   \+ X ; \+ Y ; \+ Z).
``````

Example:

``````?- cnf(X, Y, Z).
X = true,
Y = true,
Z = false .
``````

(Note that in the code you posted, you seem to have accidentally used "z(Z)" instead of the intended "nz(Z)" in the transcription of the last clause.)

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I am using Gnu Prolog 1.3, when I run the code (after defining the maplist predicate), I get some exception. Does it run on other compilers? –  banx Feb 27 '11 at 2:14
Add the rule "false :- fail." if your system does not yet support false/0. Recent development version of GNU Prolog (1.4), YAP and SWI all have it, among others. –  mat Feb 28 '11 at 9:53
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Look up "lean theorem prover" (such as leanTAP or leanCoP) for simple, short theorem provers in Prolog. Those are designed to use Prolog features to the best possible advantage. Although provers like that use first-order logic, CNF is a subset of that. There are dedicated SAT solvers for Prolog as well, such as this one.

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