Spaces H1 and BMO on ax+b-groups

Abstract

Let S be the semidirect product of Rd and R+ endowed with the Riemannian symmetric space metric and the right Haar measure: this is a Lie group of exponential growth. In this paper we define an Hardy space H1 and a BMO space in this context. We prove that the functions in BMO satisfy the John-Nirenberg inequality and that BMO may be identified with the dual space of H1. We then prove that singular integral operators which satisfy a suitable integral Hormander condition are bounded from H1 to L1 and from L∞ to BMO. We also study the real interpolation between H1, BMO and the Lp spaces.