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A Convergent 1/N Expansion for GUE

Author:
Kopelevitch, Offer  


Journal:
ANNALES HENRI POINCARE


Issue Date:
2018


Abstract(summary):

We show that the asymptotic 1/N expansion for the averages of linear statistics of the GUE is convergent when the test function is an entire function of order two and finite type. This allows to fully recover the mean eigenvalue density function for finite N from the coefficients of the expansion thus providing a resummation procedure. As an intermediate result, we compute the bilateral Laplace transform of the GUE reproducing kernel in the half-sum variable, generalizing a formula of Haagerup and ThorbjOrnsen.


Page:
3883---3899


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