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Hauptverfasser: Kiritchenko, Valentina, Tsfasman, Michael, Vladuts, Serge, Zakharevich, Ilya
Format: Preprint
Veröffentlicht: 2024
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Online-Zugang:https://arxiv.org/abs/2403.16326
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author Kiritchenko, Valentina
Tsfasman, Michael
Vladuts, Serge
Zakharevich, Ilya
author_facet Kiritchenko, Valentina
Tsfasman, Michael
Vladuts, Serge
Zakharevich, Ilya
contents Quadratic residue patterns modulo a prime are studied since 19th century. In the first part we extend existing results on the number of consecutive $\ell$-tuples of quadratic residues, studying corresponding algebraic curves and their jacobians, which happen to be products of jacobians of hyperelliptic curves. In the second part we state the last unpublished result of Lydia Goncharova on squares such that their differences are also squares, reformulate it in terms of algebraic geometry of a K3 surface, and prove it. The core of this theorem is an unexpected relation between the number of points on the K3 surface and that on a CM elliptic curve.
format Preprint
id arxiv_https___arxiv_org_abs_2403_16326
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Quadratic residue patterns, algebraic curves and a K3 surface
Kiritchenko, Valentina
Tsfasman, Michael
Vladuts, Serge
Zakharevich, Ilya
Algebraic Geometry
Number Theory
11A15, 11L10, 14H40, 14H52
Quadratic residue patterns modulo a prime are studied since 19th century. In the first part we extend existing results on the number of consecutive $\ell$-tuples of quadratic residues, studying corresponding algebraic curves and their jacobians, which happen to be products of jacobians of hyperelliptic curves. In the second part we state the last unpublished result of Lydia Goncharova on squares such that their differences are also squares, reformulate it in terms of algebraic geometry of a K3 surface, and prove it. The core of this theorem is an unexpected relation between the number of points on the K3 surface and that on a CM elliptic curve.
title Quadratic residue patterns, algebraic curves and a K3 surface
topic Algebraic Geometry
Number Theory
11A15, 11L10, 14H40, 14H52
url https://arxiv.org/abs/2403.16326