Preprocessing Vertex-Deletion Problems: Characterizing Graph Properties by Low-Rank Adjacencies
April 19, 2020 Β· Declared Dead Β· π Scandinavian Workshop on Algorithm Theory
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Authors
Bart M. P. Jansen, Jari J. H. de Kroon
arXiv ID
2004.08818
Category
cs.DS: Data Structures & Algorithms
Cross-listed
math.CO
Citations
4
Venue
Scandinavian Workshop on Algorithm Theory
Last Checked
4 months ago
Abstract
We consider the $Ξ $-free Deletion problem parameterized by the size of a vertex cover, for a range of graph properties $Ξ $. Given an input graph $G$, this problem asks whether there is a subset of at most $k$ vertices whose removal ensures the resulting graph does not contain a graph from $Ξ $ as induced subgraph. Many vertex-deletion problems such as Perfect Deletion, Wheel-free Deletion, and Interval Deletion fit into this framework. We introduce the concept of characterizing a graph property $Ξ $ by low-rank adjacencies, and use it as the cornerstone of a general kernelization theorem for $Ξ $-Free Deletion parameterized by the size of a vertex cover. The resulting framework captures problems such as AT-Free Deletion, Wheel-free Deletion, and Interval Deletion. Moreover, our new framework shows that the vertex-deletion problem to perfect graphs has a polynomial kernel when parameterized by vertex cover, thereby resolving an open question by Fomin et al. [JCSS 2014]. Our main technical contribution shows how linear-algebraic dependence of suitably defined vectors over $\mathbb{F}_2$ implies graph-theoretic statements about the presence of forbidden induced subgraphs.
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