On Blockers and Transversals of Maximum Independent Sets in Co-Comparability Graphs
Abstract
In this paper, we consider the following two problems: (i) Deletion Blocker(α) where we are given an undirected graph G=(V,E) and two integers k,d≥ 1 and ask whether there exists a subset of vertices S⊂eq V with |S|≤ k such that α(G-S) ≤ α(G)-d, that is the independence number of G decreases by at least d after having removed the vertices from S; (ii) Transversal(α) where we are given an undirected graph G=(V,E) and two integers k,d≥ 1 and ask whether there exists a subset of vertices S⊂eq V with |S|≤ k such that for every maximum independent set I we have |I S| ≥ d. We show that both problems are polynomial-time solvable in the class of co-comparability graphs by reducing them to the well-known Vertex Cut problem. Our results generalize a result of [Chang et al., Maximum clique transversals, Lecture Notes in Computer Science 2204, pp. 32-43, WG 2001] and a recent result of [Hoang et al., Assistance and interdiction problems on interval graphs, Discrete Applied Mathematics 340, pp. 153-170, 2023].
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