Surface effects in dense random graphs with sharp edge constraint

Abstract

We show that the random number Tn of triangles in a random graph on n vertices, with a strict constraint on the total number of edges, admits an expansion Tn = an3 + bn2 + Fn, where a and b are numbers, with the mean Fn = O(n) and the standard deviation σ(Tn) =σ(Fn)= O(n3/2). The presence of a `surface term' bn2 has a significance analogous to the macroscopic surface effects of materials, and is missing in the model where the edge constraint is removed. We also find the surface effect in other graph models using similar edge constraints.