Hilbert squares: derived categories and deformations
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Pieter Belmans [1] ; Lie Fu [2] ; Theo Raedschelders [3]
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[1] Max Planck Institute for Mathematics
Max Planck Institute for Mathematics
Kreisfreie Stadt Bonn, Alemania
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[2] Claude Bernard University Lyon 1
Claude Bernard University Lyon 1
Arrondissement de Lyon, Francia
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[3] University of Glasgow
University of Glasgow
Reino Unido
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- Localización: Selecta Mathematica, New Series, ISSN 1022-1824, Vol. 25, Nº. 3, 2019
- Idioma: inglés
- DOI: 10.1007/s00029-019-0482-y
- Enlaces
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Resumen
For a smooth projective variety X with exceptional structure sheaf, and X[2] the Hilbert scheme of two points on X, we show that the Fourier–Mukai functor Db(X)→Db(X[2]) induced by the universal ideal sheaf is fully faithful, provided the dimension of X is at least 2. This fully faithfulness allows us to construct a spectral sequence relating the deformation theories of X and X[2] and to show that it degenerates at the second page, giving a Hochschild–Kostant–Rosenberg-type filtration on the Hochschild cohomology of X. 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.
