Paul Bourgade, Chris Hughes, Ashkan Nikeghbali, Marc Yor
Published 2007-06-03Version 1
In this paper, we propose a probabilistic approach to the study of the characteristic polynomial of a random unitary matrix. We recover the Mellin Fourier transform of such a random polynomial, first obtained by Keating and Snaith, using a simple recursion formula, and from there we are able to obtain the joint law of its radial and angular parts in the complex plane. In particular, we show that the real and imaginary parts of the logarithm of the characteristic polynomial of a random unitary matrix can be represented in law as the sum of independent random variables. From such representations, the celebrated limit theorem obtained by Keating and Snaith is now obtained from the classical central limit theorems of Probability Theory, as well as some new estimates for the rate of convergence and law of the iterated logarithm type results.
The characteristic polynomial of a random unitary matrix and Gaussian multiplicative chaos - The $L^2$-phase
On the joint moments of the characteristic polynomials of random unitary matrices
On the maximum of the C$β$E field
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