Upper bounds for domination numbers of graphs using Tur\'an's Theorem and Lov\'asz local lemma

Abstract

Let G be a connected graph of order n with vertex set V(G). A subset S⊂eq V(G) is an (a,b)-dominating set if every vertex v∈ S is adjacent to at least a vertices in S and every v∈ V S is adjacent to at least b vertices in S. The minimum cardinality of an (a,b)-dominating set of G is the (a,b)-domination number of G, denoted by γa,b(G). There are various results about upper bounds for γa,b(G) when G is regular or a and b are small numbers. In the first part of this paper, for a given graph G with the minimum degree of \a,b\, we define a new graph G' associated to G and show that the independence number of this graph is related to γa,b(G). In the next part, using Lov\'asz local lemma, we give a randomized approach to improve previous results in some special cases.