A. Magyar, E. M. Stein, S. Wainger
Published 2004-09-20Version 1
In this paper we prove an analogue in the discrete setting of \Bbb Z^d, of the spherical maximal theorem for \Bbb R^d. The methods used are two-fold: the application of certain "sampling" techniques, and ideas arising in the study of the number of representations of an integer as a sum of d squares in particular, the "circle method". The results we obtained are by necessity limited to d \ge 5, and moreover the range of p for the L^p estimates differs from its analogue in \Bbb R^d.
Comments: 20 pages, published version
Journal: Ann. of Math. (2), Vol. 155, (2002), no. 1, 189--208
Discrete Analogues in Harmonic Analysis: Directional Maximal Functions in $\mathbb{Z}^2$
Discrete Analogues in Harmonic Analysis: A Theorem of Stein-Wainger
Some topics in complex and harmonic analysis, 4
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