Lp and Schauder estimates for nonvariational operators structured on H\"ormander vector fields with drift

Abstract

We consider linear second order nonvariational partial differential operators of the kind aijXiXj+X0, on a bounded domain of Rn, where the Xi's (i=0,1,2,...,q, n>q+1) are real smooth vector fields satisfying H\"ormander's condition and aij (i,j=1,2,...,q) are real valued, bounded measurable functions, such that the matrix aij is symmetric and uniformly positive. We prove that if the coefficients aij are H\"older continuous with respect to the distance induced by the vector fields, then local Schauder estimates on XiXju, X0u hold; if the coefficients belong to the space VMO with respect to the distance induced by the vector fields, then local Lp estimates on Xiju, X0u hold. The main novelty of the result is the presence of the drift term X0, so that our class of operators covers, for instance, Kolmogorov-Fokker-Planck operators.