Toward a Nordhaus-Gaddum Inequality for the Number of Dominating Sets

Abstract

A dominating set in a graph G is a set S of vertices such that every vertex of G is either in S or is adjacent to a vertex in S. Nordhaus-Gaddum inequailties relate a graph G to its complement G. In this spirit Wagner proved that any graph G on n vertices satisfies ∂(G)+∂(G)≥ 2n where ∂(G) is the number of dominating sets in a graph G. In the same paper he comments that an upper bound for ∂(G)+∂(G) among all graphs on n vertices seems to be much more difficult. Here we prove an upper bound on ∂(G)+∂(G) and prove that any graph maximizing this sum has minimum degree at least n/2-2 and maximum degree at most n/2+1. We conjecture that the complete balanced bipartite graph maximizes ∂(G)+∂(G) and have verified this computationally for all graphs on at most 10 vertices.