Maximum spectral gap of regular graphs with bounded essential edge-connectivity

Abstract

An edge-cut of a graph is said to be essential if its removal results in a graph with at least two non-trivial components. The essential edge-connectivity of a graph G is the minimum cardinality among all essential edge-cuts of G. The spectral gap of G is the difference between its largest and second largest eigenvalues. In this paper, we prove that for any integers t and r with 6≤ r≤ t≤ 2r-3, the maximum spectral gap among all connected r-regular graphs with essential edge-connectivity at most t is equal to 12(r+7-(r+7)2-8t-32) when t-r is odd and 12(r+6-(r+6)2-8t-32) when t-r is even. We construct a family of connected r-regular graphs achieving these bounds.