The sparse circular law under minimal assumptions

Abstract

The circular law asserts that the empirical distribution of eigenvalues of appropriately normalized n× n matrix with i.i.d. entries converges to the uniform measure on the unit disc as the dimension n grows to infinity. Consider an n× n matrix An=(δij(n)ij(n)), where ij(n) are copies of a real random variable of unit variance, variables δij(n) are Bernoulli (0/1) with P\δij(n)=1\=pn, and δij(n) and ij(n), i,j∈[n], are jointly independent. In order for the circular law to hold for the sequence (1pn nAn), one has to assume that pn n ∞. We derive the circular law under this minimal assumption.