Some remarks on dimension-free estimates for the discrete Hardy-Littlewood maximal functions

Abstract

Dependencies of the optimal constants in strong and weak type bounds will be studied between maximal functions corresponding to the Hardy--Littlewood averaging operators over convex symmetric bodies acting on Rd and Zd. Firstly, we show, in the full range of p∈[1,∞], that these optimal constants in Lp( Rd) are always not larger than their discrete analogues in p( Zd); and we also show that the equality holds for the cubes in the case of p=1. This in particular implies that the best constant in the weak type (1,1) inequality for the discrete Hardy--Littlewood maximal function associated with centered cubes in Zd grows to infinity as d∞, and if d=1 it is equal to the largest root of the quadratic equation 12C2-22C+5=0. Secondly, we prove dimension-free estimates for the p( Zd) norms, p∈(1,∞], of the discrete Hardy--Littlewood maximal operators with the restricted range of scales t≥ Cq d corresponding to q-balls, q∈[2,∞). Finally, we extend the latter result on 2( Zd) for the maximal operators restricted to dyadic scales 2n Cq d1/q.