Dominating sequences under atomic changes with applications in Sierpi\'{n}ski and interval graphs

TL;DR

This paper develops efficient algorithms for calculating the Grundy domination number in interval and Sierpiński graphs, providing sharp bounds for changes in this number after removing edges or vertices.

Contribution

It introduces sharp bounds for the Grundy domination number after vertex or edge removal and provides algorithms for interval and Sierpiński graphs.

Findings

Efficient algorithm for interval graphs' Grundy domination number.

Exact value determination for Sierpiński graphs.

Sharp bounds for Grundy domination number after vertex/edge removal.

Abstract

A sequence $S=(v_1,\ldots,v_k)$ of distinct vertices of a graph $G$ is called a legal sequence if $N[v_i] \setminus \cup_{j=1}^{i-1}N[v_j]\not=\emptyset$ for any $i$. The maximum length of a legal (dominating) sequence in $G$ is called the Grundy domination number $\gamma_{gr}(G)$ of a graph $G$. It is known that the problem of determining the Grundy domination number is NP-complete in general, while efficient algorithm exist for trees and some other classes of graphs. In this paper we find an efficient algorithm for the Grundy domination number of an interval graph. We also show the exact value of the Grundy domination number of an arbitrary Sierpi\'{n}ski graph $S_p^n$, and present algorithms to construct the corresponding sequence. These results are obtained by using the main result of the paper, which are sharp bounds for the Grundy domination number of a vertex- and edge-removed graph. That is, given a graph $G$, $e\in E(G)$, and $u\in V(G)$, we prove that $\gamma_{gr}(G)-1\le \gamma_{gr}(G-e) \le \gamma_{gr}(G)+1$ and $\gamma_{gr}(G)-2\le \gamma_{gr}(G-u) \le \gamma_{gr}(G)$. For each of the bounds there exist graphs, in which all three possibilities occur for different edges, respectively vertices.