Different-distance sets in a graph

Jason T. Hedetniemi; Stephen T. Hedetniemi; Renu C. Laskar; Henry Martyn Mulder4

doi:10.22049/cco.2019.26467.1115

Communications in Combinatorics and Optimization (Dec 2019)

Different-distance sets in a graph

Jason T. Hedetniemi,
Stephen T. Hedetniemi,
Renu C. Laskar,
Henry Martyn Mulder4

Affiliations

Jason T. Hedetniemi: Department of Mathematics, Wingate University, Wingate, NC 28174 U.S.A.
Stephen T. Hedetniemi: School of Computing, Clemson University, Clemson, SC 29634 U.S.A
Renu C. Laskar: Department of Mathematical Sciences, Clemson University, Clemson, SC 29634 U.S.A
Henry Martyn Mulder4: Econometrisch Instituut, Erasmus Universiteit, Rotterdam, Netherlands

DOI: https://doi.org/10.22049/cco.2019.26467.1115
Journal volume & issue: Vol. 4, no. 2
pp. 151 – 171

Abstract

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A set of vertices $S$ in a connected graph $G$ is a different-distance set if, for any vertex $w$ outside $S$, no two vertices in $S$ have the same distance to $w$. The lower and upper different-distance number of a graph are the order of a smallest, respectively largest, maximal different-distance set. We prove that a different-distance set induces either a special type of path or an independent set. We present properties of different-distance sets, and consider the different-distance numbers of paths, cycles, Cartesian products of bipartite graphs, and Cartesian products of complete graphs. We conclude with some open problems and questions.

Published in Communications in Combinatorics and Optimization

ISSN: 2538-2128 (Print); 2538-2136 (Online)
Publisher: Azarbaijan Shahide Madani University
Country of publisher: Iran, Islamic Republic of
LCC subjects: Science: Mathematics
Website: https://comb-opt.azaruniv.ac.ir/

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