Spectral Gap for the Stochastic Quantization Equation on the 2-dimensional Torus

TL;DR

This paper proves exponential convergence to equilibrium for the stochastic quantization equation on a 2D torus by establishing dissipative bounds, the strong Feller property, and a support theorem, without relying on reversibility or explicit invariant measures.

Contribution

It extends recent results by establishing a strong non-linear dissipative bound and proving exponential convergence to equilibrium without assuming reversibility or explicit invariant measures.

Findings

Established a dissipative bound controlling moments of solutions.

Proved the transition semigroup satisfies the strong Feller property.

Showed exponential convergence to equilibrium using the Doeblin criterion.

Abstract

We study the long time behavior of the stochastic quantization equation. Extending recent results by Mourrat and Weber we first establish a strong non-linear dissipative bound that gives control of moments of solutions at all positive times independent of the initial datum. We then establish that solutions give rise to a Markov process whose transition semigroup satisfies the strong Feller property. Following arguments by Chouk and Friz we also prove a support theorem for the laws of the solutions. Finally all of these results are combined to show that the transition semigroup satisfies the Doeblin criterion which implies exponential convergence to equilibrium. Along the way we give a simple direct proof of the Markov property of solutions and an independent argument for the existence of an invariant measure using the Krylov-Bogoliubov existence theorem. Our method makes no use of the reversibility of the dynamics or the explicit knowledge of the invariant measure and it is therefore in principle applicable to situations where these are not available, e.g. the vector-valued case.