Linear and fully nonlinear elliptic equations with Ld-drift

Abstract

In subdomains of Rd we consider uniformly elliptic equations H(v( x),D v( x),D2v( x), x)=0 with the growth of H with respect to |Dv| controlled by the product of a function from Ld times |Dv|. The dependence of H on x is assumed to be of BMO type. Among other things we prove that there exists d0∈(d/2,d) such that for any p∈(d0,d) the equation with prescribed continuous boundary data has a solution in class W2p,loc. Our results are new even if H is linear.