Peter J. Forrester, Dang-Zheng Liu
Published 2020-12-26Version 1
We study the averaged products of characteristic polynomials for the Gaussian and Laguerre $\beta$-ensembles with external source, and prove Pearcey-type phase transitions for particular full rank perturbations of source. The phases are characterised by determining the explicit functional forms of the scaled limits of the averaged products of characteristic polynomials, which are given as certain multidimensional integrals, with dimension equal to the number of products.
Journal: Acta Mathematica Sinica, English Series 2020
Convergence of local statistics of Dyson Brownian motion
Edge scaling limit of Dyson Brownian motion at equilibrium for general $β\geq 1$
Maximum of Dyson Brownian motion and non-colliding systems with a boundary
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