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Deformations of polystable sheaves on surfaces: quadraticity implies formality
Ruggero Bandiera, Marco Manetti, Francesco Meazzini
Università degli studi di Roma La Sapienza, Dipartimento di Matematica “Guido Castelnuovo”, P.le Aldo Moro 5, I-00185 Roma, Italy
Abstract:
We study relations between the quadraticity of the Kuranishi family of a coherent sheaf on a complex projective scheme and the formality of the DG-Lie algebra of its derived endomorphisms. In particular, we prove that for a polystable coherent sheaf of a smooth complex projective surface the DG-Lie algebra of derived endomorphisms is formal if and only if the Kuranishi family is quadratic.
Key words and phrases:
deformation theory, polystable sheaves, formality, differential graded Lie algebras, $L_{\infty}$-algebras.
Citation:
Ruggero Bandiera, Marco Manetti, Francesco Meazzini, “Deformations of polystable sheaves on surfaces: quadraticity implies formality”, Mosc. Math. J., 22:2 (2022), 239–263
Linking options:
https://www.mathnet.ru/eng/mmj827 https://www.mathnet.ru/eng/mmj/v22/i2/p239
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| Abstract page: | 25 | | References: | 8 |
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