On the modularity of 3-regular random graphs and random graphs with given degree sequences

Abstract

The modularity of a graph is a parameter that measures its community structure; the higher its value (between 0 and 1), the more clustered the graph is. In this paper we show that the modularity of a random 3-regular graph is at least 0.667026 asymptotically almost surely (a.a.s.), thereby proving a conjecture of McDiarmid and Skerman. We also improve the a.a.s. upper bound given therein to 0.789998. For a uniformly chosen graph Gn over a given bounded degree sequence with average degree d(Gn) and with |CC(Gn)| many connected components, we distinguish two regimes with respect to the existence of a giant component. In the subcritical regime, we compute the second term of the modularity. In the supercritical regime, we prove that there is > 0, for which the modularity is a.a.s. at least equation* 2(1 - μ)d(Gn)+, equation* where μ is the asymptotically almost sure limit of |CC(Gn)|n.