On the support of admissible subcategories

Abstract

Let X be a smooth proper variety over an algebraically closed field of characteristic zero, and let A ⊂ Dbcoh(X) be an admissible subcategory. Let Z ⊂ X be the union of set-theoretical supports of all objects in A and assume that Z ≠ X. We show that for any morphism from Z to an abelian variety each fiber has no isolated points; this implies, for example, that Z cannot be isomorphic to an abelian variety. The key input is the fact that while not all line bundles on Z lift to infinitesimal thickenings of Z, sufficiently many do: specifically, we show that for any infinitesimal thickening Z ⊂ Z the restriction morphism Pic0(Z) Pic0(Z) on the connected components of Picard schemes induces an isogeny between Albanese group schemes of those connected components.