The minimum degree of minimally t-tough graphs

Abstract

A graph G is minimally t -tough if the toughness of G is t and deletion of any edge from G decreases its toughness. Katona et al. conjectured that the minimum degree of any minimally t -tough graph is 2t and gave some upper bounds on the minimum degree of the minimally t -tough graphs in Katona, Gyula. In this paper, we show that a minimally 1-tough graph G with girth g≥ 5 has minimum degree at most ng+1+g-1, and a minimally 1 -tough graph with girth 4 has minimum degree at most n+64. We also prove that the minimum degree of minimally 32-tough claw-free graphs is 3 .