Abstract
Let G be a graph in which each vertex v has a positive integer weight b(v) and each edge (v,w) has a nonnegative integer weight b(v,w). A bandwidth consecutive multicoloring, simply called a b-coloring of G, assigns each vertex v a specified number b(v) of consecutive positive integers as colors of v so that, for each edge (v,w), all integers assigned to vertex v differ from all integers assigned to vertex w by more than b(v,w). The maximum integer assigned to vertices is called the span of the coloring. The b-coloring problem asks to find a b-coloring of a given graph G with the minimum span. In the paper, we present four efficient approximation algorithms for the problem, which have theoretical performance guarantees for the computation time, the span of a found b-coloring and the approximation ratio. We also obtain several upper bounds on the minimum span, expressed in terms of the maximum b-degrees, one of which is an extension of Brooks’ theorem on an ordinary coloring.
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Obata, Y., Nishizeki, T. (2014). Approximation Algorithms for Bandwidth Consecutive Multicolorings. In: Chen, J., Hopcroft, J.E., Wang, J. (eds) Frontiers in Algorithmics. FAW 2014. Lecture Notes in Computer Science, vol 8497. Springer, Cham. https://doi.org/10.1007/978-3-319-08016-1_18
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DOI: https://doi.org/10.1007/978-3-319-08016-1_18
Publisher Name: Springer, Cham
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