Bulk properties of the Airy line ensemble
Duncan Dauvergne, Bálint Virág
Abstract
The Airy line ensemble is a central object in random matrix theory and last passage percolation defined by a determinantal formula. The goal of this paper is to provide a set of tools, which allow for precise probabilistic analysis of the Airy line ensemble. The two main theorems are a representation in terms of independent Brownian bridges connecting a fine grid of points, and a modulus of continuity result for all lines. Along the way, we give tail bounds and moduli of continuity for nonintersecting Brownian ensembles, and a quick proof of tightness for Dyson’s Brownian motion converging to the Airy line ensemble.
Topics & Concepts
Brownian motionMathematicsRandom matrixLine (geometry)Real lineRepresentation (politics)Percolation (cognitive psychology)Probabilistic logicMathematical analysisStatistical physicsGeometryPhysicsQuantum mechanicsPolitical scienceBiologyNeurosciencePoliticsLawStatisticsEigenvalues and eigenvectorsRandom Matrices and ApplicationsAdvanced Combinatorial MathematicsStochastic processes and statistical mechanics