Which graphs occur as γ-graphs?

Abstract

The γ-graph of a graph G is the graph whose vertices are labelled by the minimum dominating sets of G, in which two vertices are adjacent when their corresponding minimum dominating sets (each of size γ(G)) intersect in a set of size γ(G)-1. We extend the notion of a γ-graph from distance-1-domination to distance-d-domination, and ask which graphs H occur as γ-graphs for a given value of~d 1. We show that, for all d, the answer depends only on whether the vertices of H admit a labelling consistent with the adjacency condition for a conventional γ-graph. This result relies on an explicit construction for a graph having an arbitrary prescribed set of minimum distance-d-dominating sets. We then completely determine the graphs that admit such a labelling among the wheel graphs, the fan graphs, and the graphs on at most six vertices. We connect the question of whether a graph admits such a labelling with previous work on induced subgraphs of Johnson graphs.