Self-similarity in the circular unitary ensemble

Abstract

This paper gives a rigorous proof of a conjectured statistical self-similarity property of the eigenvalues random matrices from the Circular Unitary Ensemble. We consider on the one hand the eigenvalues of an n × n CUE matrix, and on the other hand those eigenvalues eiφ of an mn × mn CUE matrix with |φ| π / m, rescaled to fill the unit circle. We show that for a large range of mesoscopic scales, these collections of points are statistically indistinguishable for large n. The proof is based on a comparison theorem for determinantal point processes which may be of independent interest.