Total domination in cubic Kn\"odel graphs

Abstract

A subset D of vertices of a graph G is a dominating set if for each u∈ V(G) D, u is adjacent to some vertex v∈ D. The dominating number, γ(G) of G, is the minimum cardinality of a dominating set of G. A set D⊂eq V(G) is a total dominating set if for each u∈ V(G), u is adjacent to some vertex v∈ D. the The total dominating number, γt(G) of G, is the minimum cardinality of a total dominating set of G. For an even integer n2 and 12n, a Kn\"odel graph W,n is a -regular bipartite graph of even order n, with vertices (i,j), for i=1,2 and 0 j n/2-1, where for every j,0 j n/2-1,there is an edge between vertex (1,j) and every vertex (2,j+2k-1 (mod(n/2)), for k=0,1,·s,-1. In this paper, we determine the total domination number in 3-regular Kn\"odel graphs W3,n.