Asymptotic expansion of Toeplitz determinants of an indicator function with discrete rotational symmetry and powers of random unitary matrices

Abstract

In this short article we propose a full large N asymptotic expansion of the probability that the mth power of a random unitary matrix of size N has all its eigenvalues in a given arc-interval centered in 1 when N is large. This corresponds to the asymptotic expansion of a Toeplitz determinant whose symbol is the indicator function of several intervals having a discrete rotational symmetry. This solves and improves a conjecture left opened by the author. It also provides a rare example of the explicit computation of a full asymptotic expansion of a genus g>0 classical spectral curve, including the oscillating non-perturbative terms, using the topological recursion.

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