Affiliation:
1. Mathematics Institute (WMI) University of Warwick Coventry UK
2. Dipartimento di Matematica “F. Enriques” Università degli Studi di Milano Milano Italy
3. Department of Mathematics University of California, Santa Barbara Santa Barbara California USA
Abstract
AbstractWe prove a general criterion that guarantees that an admissible subcategory of the derived category of an abelian category is equivalent to the bounded derived category of the heart of a bounded t‐structure. As a consequence, we show that has a strongly unique dg enhancement, applying the recent results of Canonaco, Neeman, and Stellari. We apply this criterion to the Kuznetsov component when is a cubic fourfold, a GM variety, or a quartic double solid. In particular, we obtain that these Kuznetsov components have strongly unique dg enhancement and that exact equivalences of the form are of Fourier–Mukai type when , belong to these classes of varieties, as predicted by a conjecture of Kuznetsov.
Funder
Royal Society
National Science Foundation
Reference58 articles.
1. Good moduli spaces for Artin stacks;Alper J.;Ann. Inst. Fourier,2013
2. B.Antieau On the uniqueness of infinity‐categorical enhancements of triangulated categories arXiv:1812.01526 2018.
3. Moduli spaces on the Kuznetsov component of Fano threefolds of index 2;Altavilla M.;Épijournal Géom. Algébrique,2022
4. Hodge theory and derived categories of cubic fourfolds
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