Products of independent elliptic random matrices

Abstract

For fixed m > 1, we study the product of m independent N × N elliptic random matrices as N tends to infinity. Our main result shows that the empirical spectral distribution of the product converges, with probability 1, to the m-th power of the circular law, regardless of the joint distribution of the mirror entries in each matrix. This leads to a new kind of universality phenomenon: the limit law for the product of independent random matrices is independent of the limit laws for the individual matrices themselves. Our result also generalizes earlier results of G\"otze-Tikhomirov and O'Rourke-Soshnikov concerning the product of independent iid random matrices.