The Spherical Maximal Operators on Hyperbolic Spaces

Abstract

In this article we investigate Lp boundedness of the spherical maximal operator mα of (complex) order α on the n-dimensional hyperbolic space Hn, which was introduced and studied by El Kohen. We prove that when n≥ 2, for α∈R and 1<p<∞, if mα is bounded on Lp(Hn), then we must have α>1-n+n/p for 1<p≤ 2; or α≥ \1/p-(n-1)/2,(1-n)/p\ for 2<p<∞. Furthermore, we improve El Kohen's result [J. Operator Theory 3 (1980)] on Lp boundedness of mα by showing that mα is bounded on Lp(Hn) provided that Reα> \(2-n)/p-1/(p pn),(2-n)/p- (p-2)/[p pn(pn-2)]\ for 2≤ p≤ ∞, with pn=2(n+1)/(n-1) for n≥ 3 and pn=4 for n=2.