Hilbert squares: derived categories and deformations
Abstract
For a smooth projective variety with exceptional structure sheaf, and the Hilbert scheme of two points on , we show that the Fourier-Mukai functor induced by the universal ideal sheaf is fully faithful, provided the dimension of is at least 2. This fully faithfulness allows us to construct a spectral sequence relating the deformation theories of and and to show that it degenerates at the second page, giving a Hochschild-Kostant-Rosenberg-type filtration on the Hochschild cohomology of . These results generalise known results for surfaces due to Krug-Sosna, Fantechi and Hitchin. Finally, as a by-product, we discover the following surprising phenomenon: for a smooth projective variety of dimension at least 3 with exceptional structure sheaf, it is rigid if and only if its Hilbert scheme of two points is rigid. This last fact contrasts drastically to the surface case: non-commutative deformations of a surface contribute to commutative deformations of its Hilbert square.
Cite
@article{arxiv.1810.11873,
title = {Hilbert squares: derived categories and deformations},
author = {Pieter Belmans and Lie Fu and Theo Raedschelders},
journal= {arXiv preprint arXiv:1810.11873},
year = {2019}
}
Comments
28 pages, all comments welcome, added a reference to a recent faithfulness result