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Fourier interpolation from zeros of the Riemann zeta function (Online Number Theory Lunch Seminar/Heilbronn Number Theory Seminar)

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Speaker: 
Danylo Radchenko
Affiliation: 
ETH Zürich
Date: 
Wed, 2020-09-23 17:00 - 18:00
Parent event: 
Number theory lunch seminar

I will talk about a recent result that shows that any sufficiently nice even analytic function can be recovered from its values at the nontrivial zeros of \zeta(1/2+is) and the values of its Fourier transform at logarithms of integers. The proof is based on an explicit interpolation formula, whose construction relies on a strengthening of Knopp's abundance principle for Dirichlet series with functional equations. The talk is based on a joint work with Andriy Bondarenko and Kristian Seip.

Zoom meeting: ID: 943 3217 1339
For password please ask Pieter Moree (moree@mpim-...)

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