Litcius/Paper detail

One-sided reflected Brownian motions and the KPZ fixed point

Mihai Nica, Jeremy Quastel, Daniel Remenik

2020Forum of Mathematics Sigma24 citationsDOIOpen Access PDF

Abstract

Abstract We consider the system of one-sided reflected Brownian motions that is in variational duality with Brownian last passage percolation. We show that it has integrable transition probabilities, expressed in terms of Hermite polynomials and hitting times of exponential random walks, and that it converges in the 1:2:3 scaling limit to the KPZ fixed point, the scaling-invariant Markov process defined in [MQR17] and believed to govern the long-time, large-scale fluctuations for all models in the KPZ universality class. Brownian last-passage percolation was shown recently in [DOV18] to converge to the Airy sheet (or directed landscape), defined there as a strong limit of a functional of the Airy line ensemble. This establishes the variational formula for the KPZ fixed point in terms of the Airy sheet.

Topics & Concepts

MathematicsScaling limitBrownian motionFixed pointBrownian excursionScalingIntegrable systemMathematical analysisHermite polynomialsReal lineLimit (mathematics)Universality (dynamical systems)Exponential functionMarkov processAiry functionStatistical physicsDuality (order theory)ExponentReflected Brownian motionMathematical physicsMarkov chainPercolation (cognitive psychology)Stochastic processFractional Brownian motionComplex planeDynamical systems theoryRandom Matrices and ApplicationsStochastic processes and statistical mechanicsAdvanced Combinatorial Mathematics