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Does anyone know of any simpler ways of building completely balanced trees in Prolog?

Here's one solution I've found but I'm wondering if anyone knows of any simpler solutions?

This one is pretty simple but took me a little while to grasp exactly how it works.

Thanks :).

% from given solution

cbal_tree( 0, nil ) :- !.
cbal_tree( N, t(x,L,R) ) :- 
    N > 0,

    N0 is N - 1, % if N is 4, this would be 3

    N1 is N0 mod 2, % if N is 4, this would be 3 mod 2 = 1
    N2 is N0 - N1, % if N is 4, this would be 3-1= 2

    distrib( N1, N2, LeftNode, RightNode ),

    cbal_tree( LeftNode, L ), 
    cbal_tree( RightNode, R ).

distrib(N,N,N,N) :- !.
distrib(N1,N2,N1,N2). % giving these two clauses (*) 1,2,?,? could give 1,2 or 2,1
distrib(N1,N2,N2,N1). % (*)
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1 Answer 1

up vote 1 down vote accepted

This build symmetric trees:

symm_tree(nil,0).
symm_tree(t(L,R),Level) :-
    Level > 0,
    M is Level-1,
    symm_tree(L,M),
    symm_tree(R,M).

Adding labels to the nodes should be trivial.

The code you posted can be slightly simplified to

cbal_tree(0, nil).
cbal_tree(N, t(x,L,R)) :- 
    N > 0,
    N0 is N - 1,    % -1 to account for root node
    N1 is N0 mod 2,
    N2 is N0 - N1,

    permutation([N1,N2], [NLeft,NRight]),

    cbal_tree(NLeft, L),
    cbal_tree(NRight, R).

but this is really how simple it gets, and the distrib/3 handling of duplicates is gone.

share|improve this answer
    
Thanks larsmans. I see what you're getting at. However, it hangs if you ask for another solution and my tree notation is t(x,L,R) where x is a root node. Other than that.. much more simple. –  ale Jan 7 '11 at 13:19
    
Edited. This was really a very quick hack. –  larsmans Jan 7 '11 at 15:51

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