论文信息 - Bounds for Weight Balanced Trees

Bounds for Weight Balanced Trees

It has been shown that the cost W of a weight balanced binary tree satisfies the inequalities, H ≤ W ≤ H ≤ + 3, where H is the entropy of the set of the leaves. For a class of "smooth" distributions the inequalities, H ≤ W ≤ H + 2, are derived. These results imply that for sets with large entropy the search times provided by such trees cannot be substantially shortened when binary decisions are being used.

Jorma Rissanen

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