Homotopy finiteness of some DG categories from algebraic geometry

Abstract

In this paper, we prove that the bounded derived category Dbcoh(Y) of coherent sheaves on a separated scheme Y of finite type over a field k of characteristic zero is homotopically finitely presented. This confirms a conjecture of Kontsevich. We actually prove a stronger statement: Dbcoh(Y) is equivalent to a DG quotient Dbcoh(Y)/T, where Y is some smooth and proper variety, and the subcategory T is generated by a single object. The proof uses categorical resolution of singularities of Kuznetsov and Lunts KL, and a theorem of Orlov Or stating that the class of geometric smooth and proper DG categories is stable under gluing. We also prove the analogous result for Z/2-graded DG categories of coherent matrix factorizations on such schemes. In this case instead of Dbcoh(Y) we have a semi-orthogonal gluing of a finite number of DG categories of matrix factorizations on smooth varieties, proper over Ak1.