Michael Greenblatt
Published 2016-05-25Version 1
This paper is a companion paper to [G4], where sharp estimates are proven for Fourier transforms of compactly supported functions built out of two-dimensional real-analytic functions. The theorems of [G4] are stated in a rather general form. In this paper, we expand on the results of [G4] and show that there is a class of "well-behaved" functions that contains a number of relevant examples for which such estimates can be explicitly described in terms of the Newton polygon of the function. We will further see that for a subclass of these functions, one can prove noticeably more precise estimates, again in an explicitly describable way.
Fourier transforms of indicator functions, lattice point discrepancy, and the stability of integrals
Bellman VS Beurling: sharp estimates of uniform convexity for $L^p$ spaces
Various sharp estimates for semi-discrete Riesz transforms of the second order
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