On minimally tough chordal graphs
Abstract
Katona and Varga showed that for any rational number t ∈ (1/2,1], no chordal graph is minimally t-tough, while Katona and Khan characterized all minimally t-tough, chordal graphs with t 1/2. We conjecture that no chordal graph is minimally t-tough for any t>1 and prove several results supporting the conjecture. In particular, we show that for any t>1/2, no strongly chordal graph is minimally t-tough%, no split graph is minimally t-tough, and no chordal graph with a universal vertex is minimally t-tough.
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