(H,H2)-smoothing effect of Navier-Stokes equations with additive white noise on two-dimensional torus

Abstract

This paper is devoted to the regularity of Navier-Stokes (NS) equations with additive white noise on two-dimensional torus T2. Under the conditions that the external force f(x) belongs to the phase space H and the noise intensity function h(x) satisfies \|∇ h\|L∞ ≤ π λ1, where is the kinematic viscosity of the fluid and λ1 is the first eigenvalue of the Stokes operator, it was proved that the random NS equations possess a tempered (H,H2)-random attractor whose (box-counting) fractal dimension in H2 is finite. This was achieved by establishing, first, an H2 bounded absorbing set and, second, an (H,H2)-smoothing effect of the system which lifts the compactness and finite-dimensionality of the attractor in H to that in H2. Since the force f belongs only to H, the H2-regularity of solutions as well as the H2-bounded absorbing set was constructed by an indirect approach of estimating the H2-distance between the solution of the random NS equations and that of the corresponding deterministic equations.