On Eigenvalues of the sum of two random projections

Abstract

We study the behavior of eigenvalues of matrix PN + QN where PN and QN are two N -by-N random orthogonal projections. We relate the joint eigenvalue distribution of this matrix to the Jacobi matrix ensemble and establish the universal behavior of eigenvalues for large N. The limiting local behavior of eigenvalues is governed by the sine kernel in the bulk and by either the Bessel or the Airy kernel at the edge depending on parameters. We also study an exceptional case when the local behavior of eigenvalues of PN + QN is not universal in the usual sense.