Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

I wrote a program, that finds the longest coprime subsequence in a Prolog list (it is not yet perfect):

longest_lcs([A, B | Tail],X) :- gcd(A,B,1),lcs([B | Tail],X,A,1).
longest_lcs([A, B | Tail],X) :- lcs([B | Tail],X,A,0).

lcs([],G,_,_) :- rev(G,G1),write(G1).

lcs([A, B | Tail],G,Q,_) :- gcd(B,Q,1), gcd(A,B,1), lcs([B | Tail], [Q | G], A, 1),!.
lcs([A, B | Tail],G,Q,_) :- gcd(B,Q,1);gcd(A,B,1), lcs([B | Tail], [Q | G], A, 0).

lcs([A, B | Tail],G,_,0) :- gcd(A,B,1), lcs([B | Tail], G, A, 1).
lcs([A, B | Tail],G,_,1) :- lcs([B | Tail], G, A, 1).
lcs([A, B | Tail],G,_,0) :- lcs([B | Tail], G, A, 0).

lcs([A],G,Q,_) :- gcd(Q,A,1),lcs([], [A, Q | G], _, _).    

Currently I output the subsequence with the write predicate, but I need it to run the following way:

?- longest_lcs([1,2,3,4],X).
X = [1,2,3,4]

?- longest_lcs([2,4,8,16],X).
X = []

What modifications do I need to make, so this works?

share|improve this question

1 Answer 1

Why do you want to use write/1? Focus on a clear declarative description of what you want, and the toplevel will do the writing for you. A possible formulation for a longest coprime subsequence is: It is a coprime subsequence, and no other coprime subsequnce is longer. The code could look similar to this:

list_lcpsubseq(Ls, Subseq) :-
    list_subseq(Ls, Subseq),
    length(Subseq, L),
    \+ ( list_subseq(Ls, Others), coprimes(Others), length(Others, O), O > L ).
share|improve this answer
the write/1 is a temporary solution for debugging the algorithm. The problem with this solution (at a first glance) is that it won't run in polynominal time. –  skazhy Dec 29 '10 at 19:14
Is there any promise that a polynomial time algorithm exists? It seems to me the maximum length coprime subsequence is the largest clique of a graph on nodes where an edge indicates coprimality of two integers. mat's code is clear and correct (given suitable implementation of auxiliary predicates). If efficiency were a real goal (not always the case with homework), then I'd rather start by polishing mat's implementation than by polishing yours. –  hardmath Dec 30 '10 at 14:44

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.