Boundedness from H1 to L1 of Riesz transforms on a Lie group of exponential growth

Abstract

Let G be the Lie group given by the semidirect product of R2 and R+ endowed with the Riemannian symmetric space structure. Let X0, X1, X2 be a distinguished basis of left-invariant vector fields of the Lie algebra of G and define the Laplacian =-(X02+X12+X22). In this paper we consider the first order Riesz transforms Ri=Xi-1/2 and Si=-1/2Xi, for i=0,1,2. We prove that the operators Ri, but not the Si, are bounded from the Hardy space H1 to L1. We also show that the second order Riesz transforms Tij=Xi-1Xj are bounded from H1 to L1, while the Riesz transforms Sij=-1XiXj and Rij=XiXj-1 are not.