Boundedness of the dyadic maximal function on graded Lie groups

Abstract

Let 1<p≤ ∞ and let n≥ 2. It was proved independently by C. Calder\'on, R. Coifman and G. Weiss that the dyadic maximal function equation* MdσDf(x)=j∈Z|Sn-1f(x-2jy)dσ(y)| equation* is a bounded operator on Lp(Rn) where dσ(y) is the surface measure on Sn-1. In this paper we prove an analogue of this result on arbitrary graded Lie groups. More precisely, to any finite Borel measure dσ with compact support on a graded Lie group G, we associate the corresponding dyadic maximal function MDdσ using the homogeneous structure of the group. Then, we prove a criterion in terms of the order (at zero and at infinity) of the group Fourier transform dσ of dσ with respect to a fixed Rockland operator R on G that assures the boundedness of MDdσ on Lp(G) for all 1<p≤ ∞.