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When removing an independent set is optimal for reducing the chromatic number

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Article number113781
<mark>Journal publication date</mark>31/01/2024
<mark>Journal</mark>European Journal of Combinatorics
Volume115
Publication StatusPublished
Early online date1/08/23
<mark>Original language</mark>English

Abstract

How large must the chromatic number of a graph be, in terms of the graph’s maximum degree, to ensure that the most efficient way to reduce the chromatic number by removing vertices is to remove an independent set? By a reduction to a powerful, known stability form of Brooks’ theorem, we answer this question precisely, determining the threshold to within two values (and indeed sometimes a unique value) for graphs of sufficiently large maximum degree.