Kasthurirangan, Prahlad Narasimhan scite author profile

Kasthurirangan, Prahlad Narasimhan

2Publications

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37Citation Statements Given

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Applied Mathematics (United States), Stony Brook University

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Dominator Coloring Parameterized by Cluster Vertex Deletion Number

Banik¹,

Narasimhan²,

Raman³

2022

Preprint

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The Dominator Coloring problem borrows the properties of two classical problems in graph theory -Graph Coloring and Dominating Set. A dominator coloring χ d of a graph G is a proper coloring of its vertices such that each vertex dominates a color class -that is, for each v ∈ V (G), there exists a color c such thatGiven a graph G and a natural number , the Dominator Coloring problem asks if there is a dominator coloring of G which uses at most -many colors. The problem, which was first described in 2006 and studied in several papers since then, still hosts several important open questions. While it is known that Dominator Coloring is FPT (Fixed-Parameter Tractable) when parameterized by (t, ) where is the number of colors used and t the treewidth of G, the structural parameterized landscape of the problem remains unexplored. We initiate the study of Dominator Coloring through the lens of structural parameterization.Our first result in this paper is a randomized O * (c k ) algorithm for the problem where c is some constant and k is the size of a graph's Clique Modulator, a set of vertices whose deletion results in a clique. This algorithm is obtained by a non-trivial adaptation of the recent work by Gutin et al. for List Coloring parameterized by the clique modulator that uses an inclusion-exclusion based polynomial sieving technique, and in addition uses a dynamic programming based exact algorithm we develop for Dominator Coloring.Later, we go on to prove the main result of the paper that Dominator Coloring is FPT when parameterized by the size of a graph's Cluster Vertex Deletion (CVD) set, in contrast to the W[i]-hardness result for List Coloring parameterized by the CVD set size. En route, we design a simpler and faster deterministic FPT algorithm when the problem is parameterized by the size of a graph's Twin Cover. We believe that this algorithm's approach, which uses a relationship between Dominator Coloring and List Coloring that we establish, is of independent interest.

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Dominator Coloring and CD Coloring in Almost Cluster Graphs

Banik

Narasimhan

Raman

2023

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