Radix sort trees in the large
Abstract
The trie-based radix sort algorithm stores pairwise different infinite binary strings in the leaves of a binary tree in a way that the Ulam-Harris coding of each leaf equals a prefix (that is, an initial segment) of the corresponding string, with the prefixes being of minimal length so that they are pairwise different. We investigate the {\em radix sort tree chains} -- the tree-valued Markov chains that arise when successively storing infinite binary strings , according to the trie-based radix sort algorithm, where the source strings are independent and identically distributed. We establish a bijective correspondence between the full Doob--Martin boundary of the radix sort tree chain with a {\em symmetric Bernoulli source} (that is, each is a fair coin-tossing sequence) and the family of radix sort tree chains for which the common distribution of the is a diffuse probability measure on . In essence, our result characterizes all the ways that it is possible to condition such a chain of radix sort trees consistently on its behavior "in the large".
Keywords
Cite
@article{arxiv.1603.07385,
title = {Radix sort trees in the large},
author = {Steven N. Evans and Anton Wakolbinger},
journal= {arXiv preprint arXiv:1603.07385},
year = {2016}
}
Comments
15 pages, 0 figures