An endpoint estimate for the Kunze-Stein phenomenon and related maximal operators

Abstract

One of the purposes of this paper is to prove that if G is a noncompact connected semisimple Lie group of real rank one with finite center, then L2,1(G) L2,1(G)⊂eq L2,∞(G). Let K be a maximal compact subgroup of G and X=G/K a symmetric space of real rank one. We will also prove that the noncentered maximal operator M2f(z) = z∈ B 1|B| ∫B|f(z')|\,dz' is bounded from L2,1(X) to L2,∞(X) and from Lp(X) to Lp(X) in the sharp range of exponents p∈(2,∞]. The supremum in the definition of M2f(z) is taken over all balls containing the point z.

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