Well-posedness of linear elliptic equations with Ld-drifts under divergence-type conditions

Abstract

We establish the well-posedness of linear elliptic equations with critical-order drifts in Ld and positive zero-order coefficients in L1 or L2dd+2, where classical methods are often too restrictive. Our approach relies on a divergence-free transformation and a structural condition on the drift vector field, which admits a decomposition into a regular component and another whose weak divergence belongs to Lq for some q > d2. This condition is essential for constructing a suitable weight function via the weak maximum principle and the Harnack inequality. Within this framework, we prove the existence and uniqueness of weak solutions, significantly relaxing the regularity assumptions on the zero-order coefficients in Ld2.