Feedback Vertex Set and Even Cycle Transversal for H-Free Graphs:   Finding Large Block Graphs

Giacomo Paesani; Dani\"el Paulusma; Pawe{\l} Rz\k{a}\.zewski

arXiv:2105.02736·cs.DS·January 12, 2022

Feedback Vertex Set and Even Cycle Transversal for H-Free Graphs: Finding Large Block Graphs

Giacomo Paesani, Dani\"el Paulusma, Pawe{\l} Rz\k{a}\.zewski

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TL;DR

This paper establishes new polynomial-time solvability results for Feedback Vertex Set and Even Cycle Transversal problems on specific classes of H-free graphs, expanding the understanding of their computational complexity.

Contribution

The paper introduces new polynomial-time algorithms for Feedback Vertex Set and Even Cycle Transversal on sP3-free and (sP1+P5)-free graphs, extending previous results and unifying their complexity behavior.

Findings

01

Polynomial-time algorithms for sP3-free graphs

02

Polynomial-time algorithms for (sP1+P5)-free graphs

03

Unified complexity behavior for Feedback Vertex Set and Even Cycle Transversal

Abstract

We prove new complexity results for Feedback Vertex Set and Even Cycle Transversal on $H$ -free graphs, that is, graphs that do not contain some fixed graph $H$ as an induced subgraph. In particular, we prove that for every $s \geq 1$ , both problems are polynomial-time solvable for $s P_{3}$ -free graphs and $(s P_{1} + P_{5})$ -free graphs; here, the graph $s P_{3}$ denotes the disjoint union of $s$ paths on three vertices and the graph $s P_{1} + P_{5}$ denotes the disjoint union of $s$ isolated vertices and a path on five vertices. Our new results for Feedback Vertex Set extend all known polynomial-time results for Feedback Vertex Set on $H$ -free graphs, namely for $s P_{2}$ -free graphs [Chiarelli et al., TCS 2018], $(s P_{1} + P_{3})$ -free graphs [Dabrowski et al., Algorithmica 2020] and $P_{5}$ -free graphs [Abrishami et al., SODA 2021]. Together, the new results also show that both problems exhibit the same behaviour…

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Taxonomy

TopicsAdvanced Graph Theory Research · Advanced biosensing and bioanalysis techniques · Complexity and Algorithms in Graphs