Properties of minimally t-tough graphs
Abstract
A graph G is minimally t-tough if the toughness of G is t and the deletion of any edge from G decreases the toughness. Kriesell conjectured that for every minimally 1-tough graph the minimum degree δ(G)=2. We show that in every minimally 1-tough graph δ(G)n+23. We also prove that every minimally 1-tough claw-free graph is a cycle. On the other hand, we show that for every t ∈ Q any graph can be embedded as an induced subgraph into a minimally t-tough graph.
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