Residue Domination in Bounded-Treewidth Graphs

Abstract

For the vertex selection problem (σ,)-DomSet one is given two fixed sets σ and of integers and the task is to decide whether we can select vertices of the input graph such that, for every selected vertex, the number of selected neighbors is in σ and, for every unselected vertex, the number of selected neighbors is in [Telle, Nord. J. Comp. 1994]. This framework covers many fundamental graph problems such as Independent Set and Dominating Set. We significantly extend the recent result by Focke et al. [SODA 2023] to investigate the case when σ and are two (potentially different) residue classes modulo m 2. We study the problem parameterized by treewidth and present an algorithm that solves in time mtw · nO(1) the decision, minimization and maximization version of the problem. This significantly improves upon the known algorithms where for the case m 3 not even an explicit running time is known. We complement our algorithm by providing matching lower bounds which state that there is no (m-ε)pw · nO(1)-time algorithm parameterized by pathwidth pw, unless SETH fails. For m = 2, we extend these bounds to the minimization version as the decision version is efficiently solvable.