Categorical Torelli theorem for hypersurfaces
Abstract
Let X ⊂ Pn+1 be a smooth Fano hypersurface of dimension n and degree d. The derived category of coherent sheaves on X contains an interesting subcategory called the Kuznetsov component AX. We show that this subcategory, together with a certain autoequivalence called the rotation functor, determines X uniquely if d > 3 or if d = 3 and n > 3. This generalizes a result by D. Huybrechts and J. Rennemo, who proved the same statement under the additional assumption that d divides n+2.
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