On Perfect and Quasiperfect Dominations in Graphs

被引：0

作者：

Caceres, Jose ^{[1
]}

Hernando, Carmen ^{[2
]}

Mora, Merce ^{[2
]}

Pelayo, Ignacio M. ^{[2
]}

Luz Puertas, Maria ^{[1
]}

机构：

[1] Univ Almeria, Almeria, Spain

[2] Univ Politecn Cataluna, Barcelona, Spain

来源：

FILOMAT | 2017年 / 31卷 / 02期

关键词：

Domination; perfect domination; quasiperfect domination; claw-free graphs; cographs;

D O I：

10.2298/FIL1702413C

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

A subset S subset of V in a graph G = (V; E) is a k-quasiperfect dominating set (for k >= 1) if every vertex not in S is adjacent to at least one and at most k vertices in S. The cardinality of a minimum k-quasiperfect dominating set in G is denoted by gamma(1k) (G). Those sets were first introduced by Chellali et al. (2013) as a generalization of the perfect domination concept and allow us to construct a decreasing chain of quasiperfect dominating numbers n >= gamma(11) (G) >= gamma(12) (G) >= ... >= gamma(1 Delta)(G) = gamma (G) in order to indicate how far is G from being perfectly dominated. In this paper we study properties, existence and realization of graphs for which the chain is short, that is, gamma(12)(G) = gamma(G). Among them, one can find cographs, claw-free graphs and graphs with extremal values of Delta(G).

引用

页码：413 / 423

页数：11

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