Existence theory for stochastic power law fluids

Abstract

We consider the equations of motion for an incompressible Non-Newtonian fluid in a bounded Lipschitz domain G⊂ Rd during the time intervall (0,T) together with a stochastic perturbation driven by a Brownian motion W. The balance of momentum reads as dv=div\, S\,dt-(∇ v)v\,dt+∇π \,dt+f\,dt+(v)\,dWt, where v is the velocity, π the pressure and f an external volume force. We assume the common power law model S((v))=(1+|(v)|)p-2 (v) and show the existence of weak (martingale) solutions provided p>2d+2d+2. Our approach is based on the L∞-truncation and a harmonic pressure decomposition which are adapted to the stochastic setting.