On the real spectrum of a product of Gaussian random matrices

Abstract

Let Xm = G1… Gm denote the product of m independent random matrices of size N × N, with each matrix in the product consisting of independent standard Gaussian variables. Denoting by NR(m) the total number of real eigenvalues of Xm, we show that for m fixed equation* E(NR(m)) = 2Nmπ+O((N)), N ∞. equation* This generalizes a well-known result of Edelman et al. EKS94 to all m>1. Furthermore, we show that the normalized global density of real eigenvalues converges weakly in expectation to the density of the random variable |U|mB where U is uniform on [-1,1] and B is Bernoulli on \-1,1\. This proves a conjecture of Forrester and Ipsen FI16. The results are obtained by the asymptotic analysis of a certain Meijer G-function.