Three approaches to a categorical Torelli theorem for cubic threefolds of non-Eckardt type via the equivariant Kuznetsov components
Abstract
Let Y be a cubic threefold with a non-Eckardt type involution τ. Our first main result is that the τ-equivariant category of the Kuznetsov component KuZ2(Y) determines the isomorphism class of Y for general (Y,τ). We shall prove this categorical Torelli theorem via three approaches: a noncommutative Hodge theoretical one (using a generalization of the intermediate Jacobian construction due to Alexander Perry), a Bridgeland moduli theoretical one (using equivariant stability conditions), and a Chow theoretical one (using some techniques in [kuznetsovnonclodedfield2021]).The remaining part of the paper is devoted to proving an equivariant infinitesimal categorical Torelli for non-Eckardt cubic threefolds (Y,τ). To accomplish it, we prove a compatibility theorem on the algebra structures of the Hochschild cohomology of the bounded derived category Db(X) of a smooth projective variety X and on the Hochschild cohomology of a semi-orthogonal component of Db(X). Another key ingredient is a generalization of a result in [macri2009infinitesima] which shows that the twisted Hochschild-Kostant-Rosenberg isomorphism is compatible with the actions on the Hochschild cohomology and on the singular cohomology induced by an automorphism of X. In appendix, we prove an equivariant categorical Torelli theorem for arbitrary cubic threefold with a geometric involution under a natural assumption.
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