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%%
%% 16 June 2003 Bart Demoen, Tom Schrijvers, K.U.Leuven
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:- module(fibonacci,[fibonacci/0]).
:- use_module(library(chr)).

:- chr_constraint fibonacci/2, cleanup/1.

%% fibonacci(N,M) is true iff  M is the Nth Fibonacci number.

%% Top-down Evaluation with effective Tabulation
%% Contrary to the version in the SICStus manual, this one does "true"
%% tabulation

fibonacci(N,M1) # ID \ fibonacci(N,M2) <=> var(M2) | M1 = M2 pragma passive(ID).

fibonacci(0,M) ==> M = 1.

fibonacci(1,M) ==> M = 1.

fibonacci(N,M) ==>
	N > 1 | 
		N1 is N-1,
		fibonacci(N1,M1),
		N2 is N-2,
		fibonacci(N2,M2),
		M is M1 + M2.

cleanup(L), fibonacci(N,F) <=> L = [N-F|T], cleanup(T).
cleanup(L) <=> L = [].

fibonacci :-
	fibonacci(15,F),
	F == 987,
	cleanup(L),
	sort(L,SL),
	SL == [0 - 1,1 - 1,2 - 2,3 - 3,4 - 5,5 - 8,6 - 13,7 - 21,8 - 34,9 - 55,10 - 89,11 - 144,12 - 233,13 - 377,14 - 610,15 - 987].