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A new š˜¬th derivative estimate for exponential sums via Vinogradov’s mean value

Abstract:
We give a slight refinement to the process by which estimates for exponential sums are extracted from bounds for Vinogradov’s mean value. Coupling this with the recent works of Wooley, and of Bourgain, Demeter and Guth, providing optimal bounds for the Vinogradov mean value, we produce a powerful new kth derivative estimate. Roughly speaking, this improves the van der Corput estimate for k ≄ 4. Various corollaries are given, showing for example that ζ(σ+š’¾š“‰)ā‰ŖĪµš“‰(1āˆ’Ļƒ)3/2/2+ε for š“‰ ≄ 2 and 0 ≤ σ ≤ 1, for any fixed ε > 0.
Publication status:
Published
Peer review status:
Reviewed (other)

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Publisher copy:
10.1134/S0081543817010072

Authors

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Institution:
University of Oxford
Division:
MPLS
Department:
Mathematical Institute
Role:
Author


Publisher:
Pleiades Publishing
Host title:
Proceedings of the Steklov Institute of Mathematics
Journal:
Proceedings of the Steklov Institute of Mathematics More from this journal
Volume:
296
Issue:
1
Pages:
88-103
Publication date:
2017-04-27
Acceptance date:
2016-03-31
DOI:
EISSN:
1531-8605
ISSN:
0081-5438


Pubs id:
pubs:614843
UUID:
uuid:18acb1dd-6b8b-43a7-8205-2b97a6da55fb
Local pid:
pubs:614843
Source identifiers:
614843
Deposit date:
2016-04-11
ARK identifier:

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