When Variable-Length Codes Meet the Field of Error Detection
Information Theory
2022-10-07 v2 Computation and Language
Discrete Mathematics
math.IT
Abstract
Given a finite alphabet and a binary relation , a set is -{\it independent} if . Given a quasi-metric over (in the meaning of \cite{W31}) and , we associate the relation defined by if, and only if, \cite{CP02}.In the spirit of \cite{JK97,N21}, the error detection-correction capability of variable-length codes can be expressed in term of conditions over . With respect to the prefix metric, the factor one, and every quasi-metric associated to (anti-)automorphisms of the free monoid, we examine whether those conditions are decidable for a given regular code.
Keywords
Cite
@article{arxiv.2208.14681,
title = {When Variable-Length Codes Meet the Field of Error Detection},
author = {Jean Néraud},
journal= {arXiv preprint arXiv:2208.14681},
year = {2022}
}