Parameterized complexity of happy coloring problems

dc.contributor.author Agrawal, Akanksha
dc.contributor.author Aravind, N. R.
dc.contributor.author Kalyanasundaram, Subrahmanyam
dc.contributor.author Kare, Anjeneya Swami
dc.contributor.author Lauri, Juho
dc.contributor.author Misra, Neeldhara
dc.contributor.author Reddy, I. Vinod
dc.date.accessioned 2022-03-27T05:50:43Z
dc.date.available 2022-03-27T05:50:43Z
dc.date.issued 2020-10-02
dc.description.abstract In a vertex-colored graph, an edge is happy if its endpoints have the same color. Similarly, a vertex is happy if all its incident edges are happy. Motivated by the computation of homophily in social networks, we consider the algorithmic aspects of the following MAXIMUM HAPPY EDGES ( k-MHE ) problem: given a partially k-colored graph G and an integer ℓ, find an extended full k-coloring of G making at least ℓ edges happy. When we want to make ℓ vertices happy on the same input, the problem is known as MAXIMUM HAPPY VERTICES ( k-MHV ). We perform an extensive study into the complexity of the problems, particularly from a parameterized viewpoint. For every k≥3, we prove both problems can be solved in time 2nnO(1). Moreover, by combining this result with a linear vertex kernel of size (k+ℓ) for k-MHE, we show that the edge-variant can be solved in time 2ℓnO(1). In contrast, we prove that the vertex-variant remains W[1]-hard for the natural parameter ℓ. However, the problem does admit a kernel with O(k2ℓ2) vertices for the combined parameter k+ℓ. From a structural perspective, we show both problems are fixed-parameter tractable for treewidth and neighborhood diversity, which can both be seen as sparsity and density measures of a graph. Finally, we extend the known [Formula presented]-completeness results of the problems by showing they remain hard on bipartite graphs and split graphs. On the positive side, we show the vertex-variant can be solved optimally in polynomial-time for cographs.
dc.identifier.citation Theoretical Computer Science. v.835
dc.identifier.issn 03043975
dc.identifier.uri 10.1016/j.tcs.2020.06.002
dc.identifier.uri https://www.sciencedirect.com/science/article/abs/pii/S0304397520303364
dc.identifier.uri https://dspace.uohyd.ac.in/handle/1/8221
dc.subject Computational complexity
dc.subject Happy coloring
dc.subject Parameterized complexity
dc.title Parameterized complexity of happy coloring problems
dc.type Journal. Article
dspace.entity.type
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