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Automorphisms and periods of cubic fourfolds

Radu Laza, Zhiwei Zheng

2021Mathematische Zeitschrift24 citationsDOIOpen Access PDF

Abstract

Abstract We classify the symplectic automorphism groups for cubic fourfolds. The main inputs are the global Torelli theorem for cubic fourfolds and the classification of the fixed-point sublattices of the Leech lattice. Among the highlights of our results, we note that there are 34 possible groups of symplectic automorphisms, with 6 maximal cases. The six maximal cases correspond to 8 non-isomorphic, and isolated in moduli, cubic fourfolds; six of them previously identified by other authors. Finally, the Fermat cubic fourfold has the largest possible order (174, 960) for the automorphism group (non-necessarily symplectic) among all smooth cubic fourfolds.

Topics & Concepts

AutomorphismMathematicsSymplectic geometryPure mathematicsAutomorphism groupCubic formLattice (music)CombinatoricsPhysicsAcousticsAlgebraic Geometry and Number TheoryAdvanced Algebra and GeometryFinite Group Theory Research
Automorphisms and periods of cubic fourfolds | Litcius