Singular spherical maximal operators on a class of two step nilpotent Lie groups
Abstract
Let Hn R2n R be the Heisenberg group and let μt be the normalized surface measure for the sphere of radius t in R2n. Consider the maximal function defined by Mf=t>0 |f*μt|. We prove for n 2 that M defines an operator bounded on Lp(Hn) provided that p>2n/(2n-1). This improves an earlier result by Nevo and Thangavelu, and the range for Lp boundedness is optimal. We also extend the result to a more general setting of surfaces and to groups satisfying a nondegeneracy condition; these include the groups of Heisenberg type.
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