Lacunary Spherical Maximal Operators on Hyperbolic Spaces
Abstract
We prove that the lacunary spherical maximal operator, defined on the n-dimensional real hyperbolic space, is bounded on Lp(n) for all n2 and 1<p∞. In particular, the lacunary set is significantly larger than its Euclidean counterpart, reflecting the influence of the geometry at infinity of the hyperbolic space.
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