Regularity Properties of Solutions of a Class of Elliptic-parabolic Nonlinear Levi Type Equations

In this paper we prove the smoothness of solutions of a class of elliptic-parabolic nonlinear Levi type equations, represented as a sum of squares plus a vector field. By means of a freezing method the study of the operator is reduced to the analysis of a family Lξ0 of left invariant operators on a free nilpotent Lie group. The fundamental solution Γξ0 of the operator Lξ0 is used as a parametrix of the fundamental solution of the Levi operator, and provides an explicit representation formula for the solution of the given equation. Differentiating this formula and applying a bootstrap method, we prove that the solution is C∞.