Paths in a random digital tree: limiting distributions

Abstract

We study a rule of growing a sequence {t_n} of finite subtrees of an infinite m-ary tree T. Independent copies {ω (n)} of a Bernoulli-type process ω on m letters are used to trace out a sequence of paths in T. The tree t_n is obtained by cutting each , at the first node such that at most σ paths out of , pass through it. Denote by H_n the length of the longest path, h_n the length of the shortest path, and L_n the length of the randomly chosen path in t_n. It is shown that, in probability, H_n – log_an = O(1), h_n – log_b (n/log n) = 0(1), (or h_n – log_b (n/log log n) = O(1)), and that is asymptotically normal. The parameters a, b, c depend on the distribution of ω and, in case of a, also on σ. These estimates describe respectively the worst, the best and the typical case behavior of a ‘trie’ search algorithm for a dictionary-type information retrieval system, with σ being the capacity of a page.