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2011 The Picard group of a $K3$ surface and its reduction modulo $p$
Andreas-Stephan Elsenhans, Jörg Jahnel
Algebra Number Theory 5(8): 1027-1040 (2011). DOI: 10.2140/ant.2011.5.1027

Abstract

We present a method to compute the geometric Picard rank of a K3 surface over . Contrary to a widely held belief, we show that it is possible to verify Picard rank 1 using reduction at a single prime.

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Andreas-Stephan Elsenhans. Jörg Jahnel. "The Picard group of a $K3$ surface and its reduction modulo $p$." Algebra Number Theory 5 (8) 1027 - 1040, 2011. https://doi.org/10.2140/ant.2011.5.1027

Information

Received: 31 March 2010; Revised: 1 March 2011; Accepted: 1 April 2011; Published: 2011
First available in Project Euclid: 20 December 2017

zbMATH: 1243.14014
MathSciNet: MR2948470
Digital Object Identifier: 10.2140/ant.2011.5.1027

Subjects:
Primary: 14C22
Secondary: 14D15 , 14J28 , 14Q10

Keywords: $K3$ surface , Artin approximation , deformation , Picard group , Picard scheme , Van Luijk's method

Rights: Copyright © 2011 Mathematical Sciences Publishers

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