Hochschild cohomology and deformations of P-functors

Abstract

Given a split P-functor F:Db(X) Db(Y) between smooth projective varieties, we provide necessary and sufficient conditions, in terms of the Hochschild cohomology of X, for it to become spherical on the total space of a deformation of Y, and explain how the spherical twist becomes the P-twist on the special fibre. These results generalise the object case, that is when X is a point, which was studied previously by Huybrechts and Thomas, and we show how they apply to the P-functor associated to the Hilbert scheme of points on a K3 surface. In the appendix we review and reorganise some technical results due to Toda, relating to the interaction of Atiyah classes, the HKR-isomorphism, and the characteristic morphism.