Outliers in spectrum of sparse Wigner matrices

Abstract

In this paper, we study the effect of sparsity on the appearance of outliers in the semi-circular law. Let (Wn)n=1∞ be a sequence of random symmetric matrices such that each Wn is n× n with i.i.d entries above and on the main diagonal equidistributed with the product bn, where is a real centered uniformly bounded random variable of unit variance and bn is an independent Bernoulli random variable with a probability of success pn. Assuming that n∞n pn=∞, we show that for the random sequence (n)n=1∞ given by n:=θn+n pnθn, θn:=(i≤ n\| Rowi(Wn)\|22-npn,n pn), the ratio \|Wn\|n converges to one in probability. A non-centered counterpart of the theorem allows to obtain asymptotic expressions for eigenvalues of the Erdos--Renyi graphs, which were unknown in the regime n pn=( n). In particular, denoting by An the adjacency matrix of G(n,pn) and by λ|k|(An) its k-th largest (by the absolute value) eigenvalue, under the assumptions n∞ n pn=∞ and n∞pn=0 we have: -(No non-trivial outliers) If n pn n≥1 (4/e) then for any fixed k≥2, |λ|k|(An)|2n pn converges to 1 in probability. -(Outliers) If n pn n<1 (4/e) then there is >0 such that for any k∈N, we have n∞P\|λ|k|(An)|2n pn>1+\=1. On a conceptual level, our result highlights similarities in appearance of outliers in spectrum of sparse matrices and the so-called BBP phase transition phenomenon in deformed Wigner matrices.