Counting graphic sequences via integrated random walks

Abstract

Given an integer n, let G(n) be the number of integer sequences n-1 d1 d2…b dn 0 that are the degree sequence of some graph. We show that G(n)=(c+o(1))4n/n3/4 for some constant c>0, improving both the previously best upper and lower bounds by a factor of n1/4 (up to polylog-factors). Additionally, we answer a question of Royle, extend the values of n for which the exact value of G(n) is known from n290 to n 1651 and determine the asymptotic probability that the integral of a (lazy) simple symmetric random walk bridge remains non-negative.