On the m-eternal Domination Number of Cactus Graphs
July 18, 2019 Β· Declared Dead Β· π Reachability Problems
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Authors
VΓ‘clav BlaΕΎej, Jan MatyΓ‘Ε‘ KΕiΕ‘Ε₯an, TomΓ‘Ε‘ Valla
arXiv ID
1907.07910
Category
cs.DS: Data Structures & Algorithms
Cross-listed
cs.DM,
math.CO
Citations
7
Venue
Reachability Problems
Last Checked
4 months ago
Abstract
Given a graph $G$, guards are placed on vertices of $G$. Then vertices are subject to an infinite sequence of attacks so that each attack must be defended by a guard moving from a neighboring vertex. The m-eternal domination number is the minimum number of guards such that the graph can be defended indefinitely. In this paper we study the m-eternal domination number of cactus graphs, that is, connected graphs where each edge lies in at most two cycles, and we consider three variants of the m-eternal domination number: first variant allows multiple guards to occupy a single vertex, second variant does not allow it, and in the third variant additional "eviction" attacks must be defended. We provide a new upper bound for the m-eternal domination number of cactus graphs, and for a subclass of cactus graphs called Christmas cactus graphs, where each vertex lies in at most two cycles, we prove that these three numbers are equal. Moreover, we present a linear-time algorithm for computing them.
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