English

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 AA and a binary relation τA×A\tau\subseteq A^*\times A^*, a set XX is τ\tau-{\it independent} if τ(X)X= \tau(X)\cap X=\emptyset. Given a quasi-metric dd over AA^* (in the meaning of \cite{W31}) and k1k\ge 1, we associate the relation τd,k\tau_{d,k} defined by (x,y)τd,k(x,y)\in\tau_{d,k} if, and only if, d(x,y)kd(x,y)\le k \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 τd,k\tau_{d,k}. 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}
}
R2 v1 2026-06-28T00:27:43.391Z