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I have a recursion here:

located_on(A,B,[move(A,B)|_]).
located_on(B,L,[_|S]) :- located_on(B,L,S).

When I ask located_on(a,b,X). I get as follows, which is infinite.

X = [] ;
X = [move(a, b)|_G4037] ;
X = [_G4036] ;
X = [_G4036, move(a, b)|_G4040] ;
X = [_G4036, _G4039] ;
X = [_G4036, _G4039, move(a, b)|_G4043] ;
X = [_G4036, _G4039, _G4042] ;
X = [_G4036, _G4039, _G4042, move(a, b)|_G4046] ;
X = [_G4036, _G4039, _G4042, _G4045] ;
X = [_G4036, _G4039, _G4042, _G4045, move(a, b)|_G4049] 

How can I limit the depth of recursion and get finite number of results?

I tried to use:

located_on(A,B,[move(A,B)|_]).
located_on(B,L,[_|S]) :- located_on(B,L,S),length(S,N),N<5.

But I got out of local stack.

2
  • Your solutions are clearly wrong. Why don't you state the problem more clearly in your previous question ? This one is useless
    – CapelliC
    Nov 17, 2013 at 22:21
  • Sorry, what do you mean? Nov 17, 2013 at 22:38

1 Answer 1

2
length(X,N),
located_on(a,b,X).

is called iterative deepening.

Gotta luv Prolog!

8
  • @false the only difference I could see is that with between N starts from 1, instead of from 0. Is that what's wrong? thanks.
    – Will Ness
    Nov 17, 2013 at 22:45
  • There is a deeper reason why an unrealistically hight upper bound is misleading: such an upper bound makes the program terminate and thus hides the price we have to pay very often for iterative deepening: The loss of a complete search procedure. While we find all answers,we can never be for sure that there is not another one lurking around.
    – false
    Nov 17, 2013 at 22:53
  • @false IOW it's a hack. ... but without the upper bound it is now at least evident that the search is unbound, right? So ID is not the Right Thing to do. As WP puts it, it's an uninformed search.
    – Will Ness
    Nov 17, 2013 at 22:57
  • This is a general problem: There are things you can decide (= a terminating algorithm exists), and then are things where no algorithm exists but which are still interesting: They might only be semi-decidable. For those, iterative deepening is not that bad. And it is incredibly fast to write and very space efficient.
    – false
    Nov 17, 2013 at 23:00
  • Space efficient :) because it re-does a lot of stuff.
    – Will Ness
    Nov 17, 2013 at 23:02

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