Riesz potentials and p-superharmonic functions in Lie groups of Heisenberg type

Abstract

We prove a superposition principle for Riesz potentials of nonnegative continuous functions on Lie groups of Heisenberg type. More precisely, we show that the Riesz potential Rα()(g) = ∫ N(g-1 g')α-Q (g') dg', 0<α<Q, of a nonnegative function ∈ C0() on a group of Heisenberg type is necessarily either p-subharmonic or p-superharmonic, depending on p and α. Here N denotes the non-isotropic homogeneous norm on such groups, as introduced by Kaplan. This result extends to a wide class of nonabelian stratified Lie groups a recent remarkable superposition result of Lindqvist and Manfredi.