Group invariant solutions of certain partial differential equations

Abstract

Let M be a complete Riemannian manifold and G a Lie subgroup of the isometry group of M acting freely and properly on M. We study the Dirichlet Problem align* div( a( ∇ u ) ∇ u ∇ u) & =0 in \\ u|∂ & = align* where is a G-invariant domain of C2,α class in M and ∈ C0( ∂) a G-invariant function. Two classical PDE's are included in this family: the p-Laplacian (a(s)=sp-1, p>1) and the minimal surface equation (a(s)=s/ 1+s2). Our motivation is to present a method in studying G-invariant solutions for noncompact Lie groups which allows the reduction of the Dirichlet problem on unbounded domains to one on bounded domains.