Cubic Fourfolds with an Involution
Abstract
There are three types of involutions on a cubic fourfold; two of anti-symplectic type, and one symplectic. Here we show that cubics with involutions exhibit the full range of behaviour in relation to rationality conjectures. Namely, we show a general cubic fourfold with symplectic involution has no associated K3 surface and is conjecturely irrational. In contrast, we show a cubic fourfold with a particular anti-symplectic involution has an associated K3, and is in fact rational. We show such a cubic is contained in the intersection of all non-empty Hassett divisors; we call such a cubic Hassett maximal. We study the algebraic and transcendental lattices for cubics with an involution both lattice theoretically and geometrically.
Cite
@article{arxiv.2202.13213,
title = {Cubic Fourfolds with an Involution},
author = {Lisa Marquand},
journal= {arXiv preprint arXiv:2202.13213},
year = {2022}
}
Comments
33 pages, comments welcome