A new approach to the Lp-theory of - + b·∇, and its applications to Feller processes with general drifts

Abstract

We develop a detailed regularity theory of - +b·∇ in Lp( Rd), for a wide class of vector fields. The Lp-theory allows us to construct associated strong Feller process in C∞( Rd). Our starting object is an operator-valued function, which, we prove, coincides with the resolvent of an operator realization of - + b· ∇, the generator of a holomorphic C0-semigroup on Lp( Rd). Then the very form of the operator-valued function yields crucial information about smoothness of the domain of the generator.