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Backbone colorings for graphs: Tree and path backbones

✍ Scribed by Hajo Broersma; Fedor V. Fomin; Petr A. Golovach; Gerhard J. Woeginger

Publisher
John Wiley and Sons
Year
2007
Tongue
English
Weight
158 KB
Volume
55
Category
Article
ISSN
0364-9024

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✦ Synopsis

Abstract

We introduce and study backbone colorings, a variation on classical vertex colorings: Given a graph G = (V,E) and a spanning subgraph H of G (the backbone of G), a backbone coloring for G and H is a proper vertex coloring V → {1,2,…} of G in which the colors assigned to adjacent vertices in H differ by at least two. We study the cases where the backbone is either a spanning tree or a spanning path. We show that for tree backbones of G the number of colors needed for a backbone coloring of G can roughly differ by a multiplicative factor of at most 2 from the chromatic number Ο‡(G); for path backbones this factor is roughly ${{3}\over{2}}$. We show that the computational complexity of the problem β€œGiven a graph G, a spanning tree T of G, and an integer β„“, is there a backbone coloring for G and T with at most β„“ colors?” jumps from polynomial to NP‐complete between ℓ = 4 (easy for all spanning trees) and ℓ = 5 (difficult even for spanning paths). We finish the paper by discussing some open problems. Β© 2007 Wiley Periodicals, Inc. J Graph Theory 55: 137–152, 2007

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