Matrix models, Toeplitz determinants and recurrence times for powers of random unitary matrices

Abstract

The purpose of this article is to study the eigenvalues u1\, t=eitθ1,…,uN\,t=eitθN of Ut where U is a large N× N random unitary matrix and t>0. In particular we are interested in the typical times t for which all the eigenvalues are simultaneously close to 1 in different ways thus corresponding to recurrence times in the issue of quantum measurements. Our strategy consists in rewriting the problem as a random matrix integral and use loop equations techniques to compute the first orders of the large N asymptotic. We also connect the problem to the computation of a large Toeplitz determinant whose symbol is the characteristic function of several arc segments of the unit circle. In particular in the case of a single arc segment we recover Widom's formula. Eventually we explain why the first return time is expected to converge towards an exponential distribution when N is large. Numeric simulations are provided along the paper to illustrate the results.