Reconfiguration graphs for minimal domination sets
Abstract
A dominating set S in a graph is a subset of vertices such that every vertex is either in S or adjacent to a vertex in S. A minimal dominating set M is a dominating set such that M-v is not a dominating set for all v ∈ M. In this paper we introduce a reconfiguration graph R(G) for minimal dominating sets under a generalization of the token sliding model. We give some preliminary results which include showing that R(G) is connected for trees and split graphs. Additionally we classify all graphs which have R(G) = Kn and R(G) = Kn for all n.
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