Maximum of the characteristic polynomial for a random permutation matrix

Abstract

Let PN be a uniform random N× N permutation matrix and let N(z)=(zIN- PN) denote its characteristic polynomial. We prove a law of large numbers for the maximum modulus of N on the unit circle, specifically, \[ |z|=1|N(z)|= Nx0 + o(1) \] with probability tending to one as N ∞, for a numerical constant x0≈ 0.652. The main idea of the proof is to uncover a logarithmic correlation structure for the distribution of (the logarithm of) N, viewed as a random field on the circle, and to adapt a well-known second moment argument for the maximum of the branching random walk. Unlike the well-studied CUE field in which PN is replaced with a Haar unitary, the distribution of N(e2π it) is sensitive to Diophantine properties of the point t. To deal with this we borrow tools from the Hardy--Littlewood circle method in analytic number theory.