Geometric representations of binary codes embeddable in three dimensions
Combinatorics
2012-12-06 v1
Abstract
We say that a binary linear code C has a geometric representation if there exists a two dimensional simplicial complex D such that C is a punctured code of the kernel ker D of the incidence matrix of D and dim C = dim ker D. We show that every binary linear code has a geometric representation that can be embedded into R^4. Moreover, we show that a binary linear code C has a geometric representation in R^3 if and only if there exists a graph G such that C equals the cut space of G. This is a polynomially testable property and hence we can conclude that there is a polynomial algorithm that decides the minimal dimension of a geometric representation of a binary linear code.
Keywords
Cite
@article{arxiv.1212.1056,
title = {Geometric representations of binary codes embeddable in three dimensions},
author = {Pavel Rytíř},
journal= {arXiv preprint arXiv:1212.1056},
year = {2012}
}
Comments
21 pages, 19 figures