# Euclidean recursive algorithm

Ok, I know it's really a stupid question, but I can't get it. There is a task where I should find a recursive algorithm of Euclide (gcd). I've done it for one case, here:

``````nondeterm nod (integer,integer,integer)
CLAUSES
nod (X,0,X):- !.
nod (0,X,X):- !.
nod (X,0,X):-X>0.
nod (X,Y,G):-Y>0, Z = X mod Y, nod (Y,Z,G).
``````

I need to do another case, where recursion is beginnig from х0, when Xi then calling for function counting Xi+1. It should be sort of it:

``````PREDICATES
nondeterm nod (integer,integer,integer)
nondeterm nod1 (integer,integer,integer,integer,integer)
CLAUSES
nod(X,Y,Z):- nod1(X,Y,Z,0,0).
nod1 (X,Y,Z,X,Y):- Otvet = Z, write("Otvet=", Otvet, "\n"), !.
nod1 (X,Y,X,Y):- nod1 (X,Y,X,Y).
nod1 (X,Y,Z,X1,Y1):-
X1>Y1, X>0, Y>0,
Y2 = X1 mod Y1,
X2 = Y1,
nod1(X,Y,Z,X2,Y2).
``````

But it doesn't work. Please, help me with that.

-
why nondeterm? seems deterministic to me –  CapelliC Apr 8 '12 at 8:13
Sorry I don't understand your question. Where is `Xi+1`? In your first code box, `nod (X,0,X):- !.` conflicts with `nod (X,0,X):-X>0.`. The second will never be called. This rule is useless `nod1 (X,Y,X,Y):- nod1 (X,Y,X,Y).` and would loop if called. –  CapelliC Apr 8 '12 at 8:26
well... i thought cuz i need to find the result of nod. am i wrong? –  eeeee Apr 8 '12 at 8:44
Sorry, my english are bad cuz i am only usual russian girl :) i just mean that there should be two types of recursion. One acts from up to down, another - second - from down to up (if i told it in unusual way, please say me about it and i try to say it in another form). How should i stop lopping? Is there should be something, that could stop it? I don't know what it could be. –  eeeee Apr 8 '12 at 8:54
Surely you can stop (with failure) when your Xi reach X or Y –  CapelliC Apr 8 '12 at 9:36