Open AccessDistance Coloring of the Hexagonal Lattice
Author(s) -
Peter Jacko,
Stanislav Jendrol′
Publication year - 2005
Publication title -
discussiones mathematicae graph theory
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.476
H-Index - 19
eISSN - 2083-5892
pISSN - 1234-3099
DOI - 10.7151/dmgt.1269
Subject(s) - combinatorics , mathematics , lattice (music) , complete coloring , hexagonal crystal system , fractional coloring , hexagonal lattice , chromatic scale , physics , graph , crystallography , condensed matter physics , graph power , chemistry , antiferromagnetism , acoustics , line graph
Motivated by the frequency assignment problem we study the d-distant coloring of the vertices of an infinite plane hexagonal lattice H. Let d be a positive integer. A d-distant coloring of the lattice H is a coloring of the vertices of H such that each pair of vertices distance at most d apart have different colors. The d-distant chromatic number of H, denoted χd(H), is the minimum number of colors needed for a d-distant coloring of H. We give the exact value of χd(H) for any d odd and estimations for any d even
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