On the Galerkin approximation and strong norm bounds for the stochastic Navier-Stokes equations with multiplicative noise

Abstract

We investigate the convergence of the Galerkin approximation for the stochastic Navier-Stokes equations in an open bounded domain O with the non-slip boundary condition. We prove that equation* E [ t ∈ [0,T] φ1( (u(t)-un(t)) 2V) ] → 0 equation* as n → ∞ for any deterministic time T > 0 and for a specified moment function φ1(x) where un(t,x) denotes the Galerkin approximation of the solution u(t,x). Also, we provide a result on uniform boundedness of the moment E [ t ∈ [0,T] φ( u(t) 2V) ] where φ grows as a single logarithm at infinity. Finally, we summarize results on convergence of the Galerkin approximation up to a deterministic time T when the V-norm is replaced by the H-norm.