Lp-Lq estimates for the circular maximal operators on Heisenberg radial functions

Abstract

Lp boundedness of the circular maximal function MH1 on the Heisenberg group H1 has received considerable attentions. While the problem still remains open, Lp boundedness of MH1 on Heisenberg radial functions was recently shown for p>2 by Beltran, Guo, Hickman, and Seeger [2]. In this paper we extend their result considering the local maximal operator MH1 which is defined by taking supremum over 1<t<2. We prove Lp-Lq estimates for MH1 on Heisenberg radial functions on the optimal range of p,q modulo the borderline cases. Our argument also provides a simpler proof of the aforementioned result due to Beltran et al.