Degenerate p-Laplacian operators on H-type groups and applications to Hardy type inequalities

Abstract

Let G be a step-two nilpotent group of H-type with Lie algebra G=V t. We define a class of vector fields X=\Xj\ on G depending on a real parameter k 1, and we consider the corresponding p-Laplacian operator Lp,k u= divX (|X u|p-2 X u). For k=1 the vector fields X=\Xj\ are the left invariant vector fields corresponding to an orthonormal basis of V, for k=2 and G being the Heisenberg group they are introduced by Greiner Greiner-cjm79. In this paper we obtain the fundamental solution for the operator Lp,k and as an application, we get a Hardy type inequality associated with X.