Abstract:
I will briefly recall the notion of homotopy finiteness of enhanced
triangulated categories. Then it will be explained how to show that derived categories of coherent sheaves on any separated scheme of finite type over $C$ are homotopically finite, as well as categories of matrix factorizations.
The proof uses Kuznetsov-Lunts construction of categorical resolution of singularities, which in turn uses Hironaka's theorem.