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Extreme gaps between eigenvalues of Wigner matrices

Paul Bourgade

2021Journal of the European Mathematical Society20 citationsDOIOpen Access PDF

Abstract

This paper proves universality of the distribution of the smallest and largest gaps between eigenvalues of generalized Wigner matrices, under some smoothness assumption for the density of the entries. The proof relies on the Erdős–Schlein–Yau dynamic approach. We exhibit a new observable that satisfies a stochastic advection equation and reduces local relaxation of the Dyson Brownian motion to a maximum principle. This observable also provides a simple and unified proof of gap universality in the bulk and the edge, which is quantitative. To illustrate this, we give the first explicit rate of convergence to the Tracy–Widom distribution for generalized Wigner matrices.

Topics & Concepts

Universality (dynamical systems)ObservableEigenvalues and eigenvectorsMathematicsWigner distribution functionBrownian motionSpectral gapMathematical physicsStatistical physicsSmoothnessMathematical analysisPure mathematicsQuantum mechanicsPhysicsQuantumStatisticsRandom Matrices and ApplicationsAdvanced Combinatorial MathematicsBayesian Methods and Mixture Models