Damping-Diffusion-Noise Interactions in the Stochastic Camassa--Holm Equation

TL;DR

This paper studies how damping, diffusion, and noise interactions affect solutions of the stochastic Camassa--Holm equation, establishing local existence, blow-up criteria, and conditions for global regularity and long-term behavior.

Contribution

It develops a local-in-time theory for the stochastic Camassa--Holm equation with interactions and identifies conditions for global regularity and measures of the system's long-term dynamics.

Findings

Established local existence and uniqueness of solutions.

Derived blow-up criteria under general conditions.

Proved existence of evolution systems of measures for long-term behavior.

Abstract

We investigate the effects of the interaction between time-inhomogeneous damping, non-local diffusion, and noise on classical solutions to the Camassa--Holm equations that incorporate these additional factors. Initially, a local-in-time theory is developed, covering the existence, uniqueness, and a blow-up criterion under relatively general conditions for these interacting factors. Subsequently, we identify different conditions on the interactions between damping, diffusion, and noise that enable the global regularity and long-time behaviour of classical solutions. Notably, we demonstrate the existence of an evolution system of measures, generalising the concept of invariant measures to the time-inhomogeneous system.