Complete Variable-Length Codes: An Excursion into Word Edit Operations
Computation and Language
2019-12-06 v1 Discrete Mathematics
Abstract
Given an alphabet A and a binary relation A * x A * , a language X A * is -independent if (X) X = ; X is -closed if (X) X. The language X is complete if any word over A is a factor of some concatenation of words in X. Given a family of languages F containing X, X is maximal in F if no other set of F can stricly contain X. A language X A * is a variable-length code if any equation among the words of X is necessarily trivial. The study discusses the relationship between maximality and completeness in the case of -independent or -closed variable-length codes. We focus to the binary relations by which the images of words are computed by deleting, inserting, or substituting some characters.
Cite
@article{arxiv.1912.02646,
title = {Complete Variable-Length Codes: An Excursion into Word Edit Operations},
author = {Jean Néraud},
journal= {arXiv preprint arXiv:1912.02646},
year = {2019}
}