Theodoros Assiotis, Jonathan P. Keating, Jon Warren
Published 2020-05-28Version 1
We establish the asymptotics of the joint moments of the characteristic polynomial of a random unitary matrix and its derivative for general real values of the exponents, proving a conjecture made by Hughes in 2001. Moreover, we give a probabilistic representation for the leading order coefficient in the asymptotic in terms of a real-valued random variable that plays an important role in the ergodic decomposition of the Hua-Pickrell measures. This enables us to establish connections between the characteristic function of this random variable and the $\sigma$-Painlev\'{e} III' equation.
The characteristic polynomial of a random unitary matrix and Gaussian multiplicative chaos - The $L^2$-phase
The characteristic polynomial of a random unitary matrix: a probabilistic approach
On the maximum of the C$β$E field
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