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Abstract Using the algebraic criterion proved by Bandiera, Manetti and Meazzini, we show the formality conjecture for universally gluable objects with linearly reductive automorphism groups in the bounded derived category of a K3 surface. As an application, we prove the formality conjecture for polystable objects in the Kuznetsov components of Gushel–Mukai threefolds and quartic double solids.
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Li, Chunyi; Pertusi, Laura; Zhao, Xiaolei (, Algebraic Geometry)
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Li, Chunyi; Pertusi, Laura; Zhao, Xiaolei (, Advances in Mathematics)
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Li, Chunyi; Pertusi, Laura; Zhao, Xiaolei (, Journal of the London Mathematical Society)Abstract We 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.more » « less
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Perry, Alexander; Pertusi, Laura; Zhao, Xiaolei (, Geometry & Topology)
