Reducing graph transversals via edge contractions
Abstract
For a graph invariant , the Contraction() problem consists in, given a graph and two positive integers , deciding whether one can contract at most edges of to obtain a graph in which has dropped by at least . Galby et al. [ISAAC 2019, MFCS 2019] recently studied the case where is the size of a minimum dominating set. We focus on graph invariants defined as the minimum size of a vertex set that hits all the occurrences of graphs in a collection according to a fixed containment relation. We prove co-NP-hardness results under some assumptions on the graphs in , which in particular imply that Contraction() is co-NP-hard even for fixed when is the size of a minimum feedback vertex set or an odd cycle transversal. In sharp contrast, we show that when is the size of a minimum vertex cover, the problem is in XP parameterized by .
Keywords
Cite
@article{arxiv.2005.01460,
title = {Reducing graph transversals via edge contractions},
author = {Paloma T. Lima and Vinicius F. dos Santos and Ignasi Sau and Uéverton S. Souza},
journal= {arXiv preprint arXiv:2005.01460},
year = {2021}
}
Comments
19 pages, 2 figures