Elliptic equations in Sobolev spaces with Morrey drift and the zeroth-order coefficients
Abstract
We consider elliptic equations with operators L=aijDij+biDi-c with a being almost in VMO, b in a Morrey class containing Ld, and c≥0 in a Morrey class containing Ld/2. We prove the solvability in Sobolev spaces of Lu=f∈ Lp in bounded C1,1-domains, and of λ u-Lu=f in the whole space for any λ>0. Weak uniqueness of the martingale problem associated with such operators is also discussed.
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