IVHS via Kuznetsov components and categorical Torelli theorems for weighted hypersurfaces

Abstract

We study the categorical Torelli theorem for smooth (weighted) hypersurfaces in (weighted) projective spaces via the Hochschild--Serre algebra of its Kuznetsov component. In the first part of the paper, we show that a natural graded subalgebra of the Hochschild--Serre algebra of the Kuznetsov component of a degree d weighted hypersurface in P(a0,…,an) reconstructs the graded subalgebra of the Jacobian ring generated by the degree t:=gcd(d,i=0nai) piece under mild assumptions. Using results of Donagi and Cox--Green, this gives a categorical Torelli theorem for most smooth hypersurfaces Y of degree d n in Pn such that d does not divide n+1 (the exception being the cases of the form (d,n) = (4, 4k + 2), for which a result of Voisin lets us deduce a generic categorical Torelli theorem when k 150). Next, we show that the Jacobian ring of the Veronese double cone can be reconstructed from its graded subalgebra of even degree, thus proving a categorical Torelli theorem for the Veronese double cone. In the second part, we rebuild the infinitesimal Variation of Hodge structures of a series of (weighted) hypersurfaces from their Kuznetsov components via the Hochschild--Serre algebra. As a result, we prove categorical Torelli theorems for two classes of (weighted) hypersurfaces: (1): Generalized Veronese double cone; (2): Certain k-sheeted covering of Pn, when they are generic. Then, we prove a refined categorical Torelli theorem for a Fano variety whose Kuznetsov component is a Calabi--Yau category of dimension 2m+1. Finally, we prove the actual categorical Torelli theorem for generalized Veronese double cone and k-sheeted covering of Pn.