Uniform regular weighted graphs with large degree: Wigner's law, asymptotic freeness and graphons limit

Abstract

For each N≥ 1, let GN be a simple random graph on the set of vertices [N]=\1,2, ..., N\, which is invariant by relabeling of the vertices. The asymptotic behavior as N goes to infinity of correlation functions: CN(T)= E[ Π(i,j) ∈ T ( 1(\i,j\ ∈ GN ) - P(\i,j\ ∈ GN) )], \ T ⊂ [N]2 finite furnishes informations on the asymptotic spectral properties of the adjacency matrix AN of GN. Denote by dN = N× P(\i,j\ ∈ GN) and assume dN, N-dNN → ∞ ∞. If CN(T) =(dNN)|T| × O(dN- |T|2) for any T, the standardized empirical eigenvalue distribution of AN converges in expectation to the semicircular law and the matrix satisfies asymptotic freeness properties in the sense of free probability theory. We provide such estimates for uniform dN-regular graphs GN,dN, under the additional assumption that | N 2 - dN- η dN| N → ∞ ∞ for some η>0. Our method applies also for simple graphs whose edges are labelled by i.i.d. random variables.