Characterization of Well-Totally Dominated Trees
Abstract
Let G be a graph with no isolated vertices. A set of vertices S is a total dominating set (TDS) if every vertex in G is adjacent to at least one vertex in S. We say G is well-totally dominated (WTD) if every minimal TDS has the same size. In this paper, we present two characterizations of well-totally dominated trees, one being descriptive and the other being constructive. In particular, our characterizations imply that it takes only polynomial time to verify whether a given tree is WTD.
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