English

Laplacian Simplices II: A Coding Theoretic Approach

Combinatorics 2018-09-11 v1

Abstract

This paper further investigates \emph{Laplacian simplices}. A construction by Braun and the first author associates to a simple connected graph GG a simplex \cPG\cP_G whose vertices are the rows of the Laplacian matrix of GG. In this paper we associate to a reflexive \cPG\cP_G a duality-preserving linear code \cC(\cPG)\cC(\cP_G). This new perspective allows us to build upon previous results relating graphical properties of GG to properties of the polytope \cPG\cP_G. In particular, we make progress towards a graphical characterization of reflexive \cPG\cP_G using techniques from Ehrhart theory. We provide a systematic investigation of \cC(\cPG)\cC(\cP_G) for cycles, complete graphs, and graphs with a prime number of vertices. We construct an asymptotically good family of MDS codes. In addition, we show that any rational rate is achievable by such construction.

Keywords

Cite

@article{arxiv.1809.02960,
  title  = {Laplacian Simplices II: A Coding Theoretic Approach},
  author = {Marie Meyer and Tefjol Pllaha},
  journal= {arXiv preprint arXiv:1809.02960},
  year   = {2018}
}
R2 v1 2026-06-23T03:59:19.179Z