Fourier interpolation in dimensions 3 and 4 and real-variable Kloosterman sums
Abstract
We give a construction of radial Fourier interpolation formulas in dimensions 3 and 4 using Maass--Poincar\'e type series. As a corollary we obtain explicit formulas for the basis functions of these interpolation formulas in terms of what we call real-variable Kloosterman sums, which were previously introduced by Stoller. We also improve the bounds on the corresponding basis functions an,d(x), d=3,4, for fixed x, in terms of the index n.
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