Quartic Graphs with Minimum Spectral Gap

Abstract

Aldous and Fill conjectured that the maximum relaxation time for the random walk on a connected regular graph with n vertices is (1+o(1)) 3n22π2. This conjecture can be rephrased in terms of the spectral gap as follows: the spectral gap (algebraic connectivity) of a connected k-regular graph on n vertices is at least (1+o(1))2kπ23n2, and the bound is attained for at least one value of k. We determine the structure of connected quartic graphs on n vertices with minimum spectral gap which enable us to show that the minimum spectral gap of connected quartic graphs on n vertices is (1+o(1))4π2n2. From this result, the Aldous--Fill conjecture follows for k=4.