Notes on the Dirichlet problem of a class of second order elliptic partial differential equations on a Riemannian manifold

Abstract

In these notes we study the Dirichlet problem for critical points of a convex functional of the form \[ F(u)=∫φ( ∇ u ) , \] where is a bounded domain of a complete Riemannian manifold M. We also study the asymptotic Dirichlet problem when =M is a Cartan-Hadamard manifold. Our aim is to present a unified approach to this problem which comprises the classical examples of the p-Laplacian (φ(s)=sp, p>1) and the minimal surface equation (φ(s)=1+s2). Our approach does not use the direct method of the Calculus of Variations which seems to be common in the case of the p-Laplacian. Instead, we use the classical method of a-priori C1 estimates of smooth solutions of the Euler-Lagrange equation. These estimates are obtained by a coordinate free calculus. Degenerate elliptic equations like the p-Laplacian are dealt with by an approximation argument. These notes address mainly researchers and graduate students interested in elliptic partial differential equations on Riemannian manifolds and may serve as a material for corresponding courses and seminars.