Div-Curl Problems and H1-regular Stream Functions in 3D Lipschitz Domains

Abstract

We consider the problem of recovering the divergence-free velocity field U∈L2() of a given vorticity F=curl\, U on a bounded Lipschitz domain ⊂R3. To that end, we solve the "div-curl problem" for a given F∈ H-1(). The solution is expressed in terms of a vector potential (or stream function) A∈ H1() such that U=curl\, A. After discussing existence and uniqueness of solutions and associated vector potentials, we propose a well-posed construction for the stream function. A numerical method based on this construction is presented, and experiments confirm that the resulting approximations display higher regularity than those of another common approach.