Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I have the following relation: index(X,N,List).

for example:

index(X,2,[a,b,c]).
X=b

index(b,N,[a,b,c]).
N=2

I don't know how to make my relation to work with the second example. It says that N is not defined well Here is my code (it works well for the first example).

index(X,1,[X|_]).
index(X,N,[_|Tail]) :- N > 1, N1 is N - 1 , index(X,N1,Tail).
share|improve this question
add comment

2 Answers 2

up vote 0 down vote accepted

There is a SWI-Prolog built-in nth1/3 that does what you want:

?- nth1(N, [a, b, c], b).
N = 2 ;
false.

Look at its source code:

?- listing(nth1).
lists:nth1(A, C, D) :-
    integer(A), !,
    B is A+ -1,
    nth0_det(B, C, D).
lists:nth1(A, B, C) :-
    var(A), !,
    nth_gen(B, C, 1, A).

true.

?- listing(nth0_det).
lists:nth0_det(0, [A|_], A) :- !.
lists:nth0_det(1, [_, A|_], A) :- !.
lists:nth0_det(2, [_, _, A|_], A) :- !.
lists:nth0_det(3, [_, _, _, A|_], A) :- !.
lists:nth0_det(4, [_, _, _, _, A|_], A) :- !.
lists:nth0_det(5, [_, _, _, _, _, A|_], A) :- !.
lists:nth0_det(A, [_, _, _, _, _, _|C], D) :-
    B is A+ -6,
    B>=0,
    nth0_det(B, C, D).

true.

?- listing(nth_gen).
lists:nth_gen([A|_], A, B, B).
lists:nth_gen([_|B], C, A, E) :-
    succ(A, D),
    nth_gen(B, C, D, E).

true.
share|improve this answer
add comment

The variable N has not been instantiated to a numeric type when Prolog attempts to evaluate the goals N > 1 and N1 is N - 1 in the recursive clause defining index/3. This causes the instantiation error you are reporting.

I don't know how to solve your problem directly, but I have two suggestions. The first is to use an accumulator, so that the arithmetic operations in the recursive clause can be evaluated:

get(M,Xs,X) :- get(1,M,Xs,X).
get(N,N,[X|_],X).
get(N,M,[_|Xs],X) :-
  L is N + 1,
  get(L,M,Xs,X).

For instance:

?- index(N,[a,b],X).
   N = 1,
   X = a ;
   N = 2,
   X = b ;
   false.

The other is to use a natural number type, so that the index can be constructed via unification:

nat(0).
nat(s(N)) :- nat(N).

get(s(0),[X|_],X).
get(s(N),[_|Y],X) :- get(N,Y,X).

For instance,

?- get(N,[a,b],X).
   N = s(0),
   X = a ;
   N = s(s(0)),
   X = b ;
   false.

Hopefully this was helpful. Perhaps someone more knowledgeable will come along and give a better solution.

share|improve this answer
    
thanks , the solution i've found is easier ... the second line is: index(X,N,[_|Tail]) :- index(X,N1,Tail), N is N1 + 1. –  alexpov Jun 6 '11 at 12:38
add comment

Your Answer

 
discard

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.