Dyadic Sets, Maximal Functions and Applications on ax+b --Groups

Abstract

Let S be the Lie group Rn R+ endowed with the left-invariant Riemannian symmetric space structure and the right Haar measure , which is a Lie group of exponential growth. Hebisch and Steger in [Math. Z. 245(2003), 37--61] proved that any integrable function on (S,) admits a Calder\'on--Zygmund decomposition which involves a particular family of sets, called Calder\'on--Zygmund sets. In this paper, we first show the existence of a dyadic grid in the group S, which has nice properties similar to the classical Euclidean dyadic cubes. Using the properties of the dyadic grid we shall prove a Fefferman--Stein type inequality, involving the dyadic maximal Hardy--Littlewood function and the dyadic sharp dyadic function. As a consequence, we obtain a complex interpolation theorem involving the Hardy space H1 and the BMO space introduced in [Collect. Math. 60(2009), 277--295].