Mathematical Research Letters

Volume 25 (2018)

Number 4

Automorphisms of Salem degree $22$ on supersingular K3 surfaces of higher Artin invariant

Pages: 1143 – 1150

DOI: http://dx.doi.org/10.4310/MRL.2018.v25.n4.a4

Author

Simon Brandhorst (Institut für Algebraische Geometrie, Leibniz Universität, Hannover, Germany)

Abstract

We give a short proof that every supersingular K3 surface (except possibly in characteristic $2$ with Artin invariant $\sigma = 10$) has an automorphism of Salem degree $22$. In particular an infinite subgroup of the automorphism group does not lift to characteristic zero. The proof relies on the case $\sigma = 1$ and the cone conjecture for K3 surfaces.

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Received 1 November 2016