Improved bound on the number of edges of diameter-k-critical graphs

Abstract

A graph is diameter-k-critical if its diameter equals k and the deletion of any edge increases its diameter. The Murty-Simon Conjecture states that for any diameter-2-critical graph G of order n, e(G) ≤ n24, with equality if and only if G K n2, n2. F\"uredi (JGT,1992) proved that this conjecture is true for sufficiently large n. Over two decades later, Loh and Ma (JCT-B, 2016) proved that e(G) ≤ n26+o(n2) for diameter-3-critical graphs G, and e(G) ≤ 3n2k for diameter-k-critical graphs G with k ≥ 4. In this paper, we improve the bound for diameter-k-critical graphs to n22k+o(n2).