Existence and uniqueness of weak solution in W1,2+ for elliptic equation with drifts in weak-Ln spaces

Abstract

We consider the following Dirichlet problems for elliptic equations with singular drift b: \[ (a) -div(A ∇ u)+div(ub)=f, (b) -div(AT ∇ v)-b · ∇ v =g in , \] where is a bounded Lipschitz domain in Rn, n≥ 2. Assuming that b∈ Ln,∞()n has non-negative weak divergence in , we establish existence and uniqueness of weak solution in W1,2+0() of the problem (b) when A is bounded and uniformly elliptic. As an application, we prove unique solvability of weak solution u in q<2 W1,q0() for the problem (a) for every f∈ q<2 W-1,q().