On the structure of dominating graphs

Abstract

The k-dominating graph Dk(G) of a graph G is defined on the vertex set consisting of dominating sets of G with cardinality at most k, two such sets being adjacent if they differ by either adding or deleting a single vertex. A graph is a dominating graph if it is isomorphic to Dk(G) for some graph G and some positive integer k. Answering a question of Haas and Seyffarth for graphs without isolates, it is proved that if G is such a graph of order n 2 and with G Dk(G), then k=2 and G=K1,n-1 for some n 4. It is also proved that for a given r there exist only a finite number of r-regular, connected dominating graphs of connected graphs. In particular, C6 and C8 are the only dominating graphs in the class of cycles. Some results on the order of dominating graphs are also obtained.