Recovering Parameters from Edge Fluctuations: Beta-Ensembles and Critically-Spiked Models

Abstract

Let =\0,1,2,…\ be the point process that describes the edge scaling limit of either (i) "regular" beta-ensembles with inverse temperature β>0, or (ii) the top eigenvalues of Wishart or Gaussian invariant random matrices perturbed by r0≥1 critical spikes. In other words, is the eigenvalue point process of one of the scalar or multivariate stochastic Airy operators. We prove that a single observation of suffices to recover (almost surely) either (i) β in the case of beta-ensembles, or (ii) r0 in the case of critically-spiked models. Our proof relies on the recently-developed semigroup theory for the multivariate stochastic Airy operators. Going beyond these parameter-recovery applications, our results also (iii) refine our understanding of the rigidity properties of , and (iv) shed new light on the equality (in distribution) of stochastic Airy spectra with different dimensions and the same Robin boundary conditions.

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