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1. Properties of Partial Dominating Sets of Graphs

Author

Case, Benjamin M., Fenstermacher, Todd, Ganguly, Soumendra, and Laskar, Renu C.

Subjects
Mathematics - Combinatorics, 05C69
Abstract

A set $S\subseteq V$ is a dominating set of $G$ if every vertex in $V - S$ is adjacent to at least one vertex in $S$. The domination number $\gamma(G)$ of $G$ equals the minimum cardinality of a dominating set $S$ in $G$; we say that such a set $S$ is a $\gamma$-set. A generalization of this is partial domination which was introduced in 2017 by Case, Hedetniemi, Laskar, and Lipman [3,2] . In partial domination a set $S$ is a $p$-dominating set if it dominates a proportion $p$ of the vertices in $V$. The p-domination number $\gamma_{p}(G)$ is the minimum cardinality of a $p$-dominating set in $G$. In this paper, we investigate further properties of partial dominating sets, particularly ones related to graph products and locating partial dominating sets. We also introduce the concept of a $p$-influencing set as the union of all $p$-dominating sets for a fixed $p$ and investigate some of its properties., Comment: First presented at the 50th Southeastern International Conference on Combinatorics, Graph Theory & Computing March 4-8, 2019

Published
2019

2. $\beta$-Packing Sets in Graphs

Author

Case, Benjamin M., Haithcock, Evan M., and Laskar, Renu C.

Subjects
Mathematics - Combinatorics
Abstract

A set $S\subseteq V$ is $\alpha$-dominating if for all $v\in V-S$, $|N(v) \cap S | \geq \alpha |N(v)|.$ The $\alpha$-domination number of $G$ equals the minimum cardinality of an $\alpha$-dominating set $S$ in $G$. Since being introduced by Dunbar, et al. in 2000, $\alpha$-domination has been studied for various graphs and a variety of bounds have been developed. In this paper, we propose a new parameter derived by flipping the inequality in the definition of $\alpha$-domination. We say a set $S \subset V$ is a $\beta$-packing set of a graph $G$ if $S$ is a proper, maximal set having the property that for all vertices $v \in V-S$, $|N(v) \cap S| \leq \beta |N(v)|$ for some $0 < \beta \leq 1.$ The $\beta$-packing number of $G$ ($\beta$-pack($G$)) equals the maximum cardinality of a $\beta$-packing set in $G$. In this research, we determine $\beta$-pack($G$) for several classes of graphs, and we explore some properties of $\beta$-packing sets. Keywords: $\beta$-packing, $\alpha$-domination, graph theory, graph parameters, Comment: First presented at the 50th Southeastern International Conference on Combinatorics, Graph Theory & Computing March 2019

Published
2019

3. Offensive Alliances in Graphs

Author

Favaron, Odile, primary, Fricke, Gerd, additional, Goddard*, Wayne, additional, Hedetniemi, Sandra M., additional, Hedetniemi, Stephen T., additional, Kristiansen, Petter, additional, Laskar, Renu C., additional, and Skaggs, Duane, additional

Published
2022
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4. Partial Domination in Graphs

Author

Case, Benjamin M., Hedetniemi, Stephen T., Laskar, Renu C., and Lipman, Drew J.

Subjects
Mathematics - Combinatorics
Abstract

A set $S\subseteq V$ is a dominating set of $G$ if every vertex in $V - S$ is adjacent to at least one vertex in $S$. The domination number $\gamma(G)$ of $G$ equals the minimum cardinality of a dominating set $S$ in $G$; we say that such a set $S$ is a $\gamma$-set. The single greatest focus of research in domination theory is the determination of the value of $\gamma(G)$. By definition, all vertices must be dominated by a $\gamma$-set. In this paper we propose relaxing this requirement, by seeking sets of vertices that dominate a prescribed fraction of the vertices of a graph. We focus particular attention on $1/2$ domination, that is, sets of vertices that dominate at least half of the vertices of a graph $G$. Keywords: partial domination, dominating set, partial domination number, domination number, Comment: First presented at the 48th Southeastern International Conference on Combinatorics, Graph Theory & Computing March 6-10, 2017

Published
2017

11. On α-Domination in Graphs.

Author

Das, Angsuman, Laskar, Renu C., and Rad, Nader Jafari

Subjects
*DOMINATING set, *PATHS & cycles in graph theory, *GRAPH theory, *SET theory, *MATHEMATICAL bounds, *SPECTRAL theory
Abstract

Let G=(V,E) be an isolate-free graph. For some α with 0<α≤1, a subset S of V is said to be an α-dominating set if for all v∈V\S,|N(v)∩S|≥α|N(v)|. The size of a smallest such S is called the α-domination number and is denoted by γα(G). A set S⊆V is said to be an α-rate dominating set of G if for any vertex v∈V, |N[v]∩X|≥α|N(v)|. The minimum cardinality of an α-rate dominating set of G is called the α-rate domination numberγ×α(G). The set of distinct values of γα(G) as α runs over (0, 1] is called the α-domination spectrum of a graph G, i.e., Spα(G)={γα(G):α∈(0,1]}. In this paper, we study some properties of Spα(G) and show that γα(G) changes its value only at rational points as α runs over (0, 1]. Using this result, we characterize some values of α such that γα(G)≤nα, where n is the number of vertices in G, holds. Finally, we present some improved probabilistic upper bounds of α-domination number and α-rate domination number of a graph G. [ABSTRACT FROM AUTHOR]

Published
2018
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17. Nearly perfect sets in graphs

Author

Dunbar, Jean E., primary, Harris Jr, Frederick C., additional, Hedetniemi, Sandra M., additional, Hedetniemi, Stephen T., additional, McRae, Alice A., additional, and Laskar, Renu C., additional

Published
1995
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20. MINIMAL RANKINGS OF THE CARTESIAN PRODUCT KnKm.

Author

EYABI, GILBERT, JACOB, JOBBY, LASKAR, RENU C., NARAYAN, DARREN A., and PILLONE, DAN

Subjects
*RANKING (Statistics), *ANALYTIC geometry, *GRAPH theory, *MATHEMATICAL functions, *PATHS & cycles in graph theory, *MAXIMUM principles (Mathematics), *GRAPH coloring
Abstract

For a graph G = (V,E), a function f : V (G) → {1, 2, . . . , k} is a k-ranking if f(u) = f(v) implies that every u--v path contains a vertex w such that f(w) > f(u). A k-ranking is minimal if decreasing any label violates the definition of ranking. The arank number,ψ r(G), of G is the maximum value of k such that G has a minimal k-ranking. We completely determine the arank number of the Cartesian product K n□ Kn, and we investigate the arank number of K n□K m where n > m. [ABSTRACT FROM AUTHOR]

Published
2012
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