Finding b-colorings Using Feedback Edges
Abstract
A b-coloring of a graph is a proper vertex coloring such that each color class contains a vertex that sees all other colors in its neighborhood. The b-coloring problem, in which the task is to decide whether a graph admits a b-coloring with k colors, is NP-complete in general but polytime solvable on trees. Moreover, it is known that b-coloring is in XP but W[t]-hard for all t ∈ N when parameterized by tree-width. In fact, only very few parameters, such as the vertex cover number, were known to admit an FPT algorithm for b-coloring. In this paper, we consider a more restrictive parameter measuring similarity to trees than tree-width, namely the feedback edge number, and show that b-coloring is fixed-parameter tractable under this parameterization. Our algorithm combines standard techniques used in parameterized algorithmics with the problem-specific ideas used in the polytime algorithm for trees. In addition, we present an FPT algorithm for b-coloring parameterized by distance to co-cluster, which is a parameter measuring similarity to complete multipartite graphs. Finally, we make several observations based on known results, including that b-coloring is W[1]-hard when parameterized by tree-depth.
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