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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?

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1 Answer

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),
    coprimes(Subseq),
    length(Subseq, L),
    \+ ( list_subseq(Ls, Others), coprimes(Others), length(Others, O), O > L ).
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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
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