Internal Schauder estimates for H\"ormander type equations with Dini continuous source

Abstract

We study the regularity properties of a general second order H\"ormander operator with Dini continous coefficients aij. Precisely if X0, X1,·s Xm are smooth self adjoint vector fields satisfying the H\"ormander condition, we consider the linear operator in RN, with N>m+1: equation* L u := Σi, j= 1m aij XiXj u - X0 u. equation* The vector field X0 plays a role similar to the time derivative in a parabolic problem so that it is a vector of degree two. We prove that, if f is a Dini continuous function, then the second order derivatives of the solution u to the equation L u = f are Dini continuous functions as well. A key step in our proof is a Taylor formula in this anisotropic setting, that we establish under minimal regularity assumptions.