Regularity theory for solutions to second order elliptic operators with complex coefficients and the Lp Dirichlet problem

Abstract

We establish a new theory of regularity for elliptic complex valued second order equations of the form L=divA(∇·), when the coefficients of the matrix A satisfy a natural algebraic condition, a strengthened version of a condition known in the literature as Lp-dissipativity. Precisely, the regularity result is a reverse H\"older condition for Lp averages of solutions on interior balls, and serves as a replacement for the De Giorgi - Nash - Moser regularity of solutions to real-valued divergence form elliptic operators. In a series of papers, Cialdea and Maz'ya studied necessary and sufficient conditions for Lp-dissipativity of second order complex coefficient operators and systems. Recently, Carbonaro and Dragicevi\'c introduced a condition they termed p-ellipticity, and showed that it had implications for boundedness of certain bilinear operators that arise from complex valued second order differential operators. Their p-ellipticity condition is exactly our strengthened version of Lp-dissipativity. The regularity results of the present paper are applied to solve Lp Dirichlet problems for L=divA(∇·)+B·∇ when A and B satisfy a natural and familiar Carleson measure condition. We show solvability of the Lp Dirichlet boundary value problem for p in the range where A is p-elliptic.