Global well-posedness for small data in a 3D temperature-velocity model with Dirichlet boundary noise

Abstract

We study a three-dimensional Boussinesq-type temperature-velocity system on a bounded smooth domain D⊂ R3, where the velocity u solves the Navier-Stokes equations and the temperature θ is driven by Dirichlet boundary noise of intensity . The boundary forcing produces a stochastic convolution Z which is, in general, only continuous in time with values in H-12-δθ( D). To handle this roughness together with initial data θ0∈ Ws,6/5( D), we work in the ambient space H-12-δu( D) with δu \δθ,12-s\. Given a finite time T>0, for any p>4 and sufficiently small initial data, we prove existence and uniqueness of a mild solution (u,θ) up to a stopping time τ T such that \[ u ∈ W1,p(0,τ;H-12-δu( D)) Lp (0,τ;H32-δu( D)), θ ∈ C(0,τ;H-12-δu( D)). \] Moreover, we obtain a high-probability global existence estimate of the form P(τ=T)≥ 1- C , with C= C( δθ, T)>0.