| Speaker: | Agnieszka Bodzenta (HSE) |
|---|---|
| Title: | Null category of morphism of relative dimension one |
| Date (JST): | Mon, Feb 09, 2015, 14:00 - 17:00 |
| Place: | Seminar Room A |
| Abstract: |
For a morphism of varieties the null category is the kernel of the derived direct image functor. It is endowed with a standard t-structure. Heart of this t-structure, the category of coherent sheaves whose derived direct images vanish, has finitely many simple objects. For a morphism of surfaces the null category has another, Ringel-dual, t-structure. In the first part, I will prove existence of the standard t-structure on a null category of a morphism of relative dimension one. I will describe properties of this t-structure with respect to composition of morphisms. I will define the Ringel dual t-structure and prove that for morphisms of smooth surfaces the null category is scheme-theoretically supported on the discrepancy divisor. In the second part I will describe the heart of Ringel dual t-structure as a category of modules over an explicit quiver with relations. This is a joint work with Alexey Bondal. |
| Remarks: | 15:00-15:30 break |
