论文信息 - Edge stability in secure graph domination

Edge stability in secure graph domination

A subset X of the vertex set of a graph G is a secure dominating set of G if X is a dominating set of G and if, for each vertex u not in X, there is a neighbouring vertex v of u in X such that the swap set (X-v)∪u is again a dominating set of G. The secure domination number of G is the cardinality of a smallest secure dominating set of G. A graph G is p-stable if the largest arbitrary subset of edges whose removal from G does not increase the secure domination number of the resulting graph, has cardinality p. In this paper we study the problem of computing p-stable graphs for all admissible values of p and determine the exact values of p for which members of various infinite classes of graphs are p-stable. We also consider the problem of determining analytically the largest value ωn of p for which a graph of order n can be p-stable. We conjecture that ωn=n-2 and motivate this conjecture.

Alewyn P. Burger | Anton Pierre de Villiers | Jan H. van Vuuren

[1] JH van Vuuren,et al. Infinite Order Domination in Graphs , 2003 .

[2] Michael A. Henning,et al. Vertex Covers and Secure Domination in Graphs , 2008 .

[3] Ernest J. Cockayne. Irredundance, secure domination and maximum degree in trees , 2007, Discret. Math..

[4] JH van Vuuren,et al. Finite Order Domination in Graphs , 2003 .

[5] Jh van Vuuren,et al. On minimum secure dominating sets of graphs , 2016 .

[6] Alewyn P. Burger,et al. Edge criticality in secure graph domination , 2015, Discret. Optim..

[7] JH van Vuuren,et al. The cost of edge failure with respect to secure graph domination , 2014 .

[8] Christina M. Mynhardt,et al. Secure domination critical graphs , 2009, Discret. Math..

[9] Peter J. Slater,et al. Fundamentals of domination in graphs , 1998, Pure and applied mathematics.