Freitag,
2012-05-25
10:00-11:00 Uhr
|
Raum 404, Eckerstr. 1
Tomasz Szemberg:
Interpolation on subspaces
Let P_1,...P_r be points in the projective space \P^n and let m_1,...,m_r be positive integer. If n=2, then the conjecture of Segre, Harbourne, Gimigliano, Hirschowitz predicts that if the points are general, then the scheme Z=m_1P_1+...+m_rP_r either imposes independent conditions on linear systems of curves of degree d, or this system has a non-reduced base curve. For higher n, even the conjectural picture is less clear. On the other hand, a celebrated result of Alexander and Hirschowitz says, that if m_1,...,m_r are fixed, then the conditions imposed
by Z on hypersurfaces of degree d are independent, provided d is sufficiently large. There is no reason to restrict imposing conditions only to points. Hartshorne and Hirschowitz studied the postulation problem for a set of general lines in \P^n. They showed that lines behave as
points, i.e. general lines impose independent conditions on
hypersurfaces. The proof of this result is pretty involved.
We study the problem more generally, asking for conditions
imposed by general configurations of linear subspaces and allowing multiplicities.
This is work in progress, joint with Brian Harbourne, Marcin Dumnicki, Joaquim Roe and Halszka Tutaj-Gasinska. |
Freitag,
2012-06-01
10:00-11:00 Uhr
|
Raum 404, Eckerstr. 1
Stefano Urbinati:
Discrepancies on normal varieties
We will investigate the idea introduced by de Fernex and Hacon for studying singularities of normal varieties, via a pull-back for Weil divisors.
We will show some pathologies of the new definition and we will explain the main properties, with highlighting how the approach relates to properties of finite generation and to singularities in positive characteristic. |
Freitag,
2012-06-29
10:00-11:00 Uhr
|
Raum 404, Eckerstr. 1
Konrad Schöbel:
Separation coordinates and moduli spaces of stable curves
Separation coordinates are coordinates in which the classical Hamilton-Jacobi
equation can be solved by a separation of variables. We establish a new and
purely algebraic approach to the classification of separation coordinates
under isometries. This will be made explicit for the least non-trivial
example: the 3-sphere. In particular, we show that the moduli space of
separation coordinates on the 3-sphere is naturally isomorphic to a certain
moduli space of stable curves with marked points. Several generalisations of
this result will be proposed. |
Freitag,
2012-07-20
10:00-11:00 Uhr
|
Raum 404, Eckerstr. 1
Ziyu Zhang (MPI Bonn):
Cotangent Complex of Moduli Spaces and Symplectic Structures
A remarkable theorem of Mukai is the existence of symplectic structures on the smooth moduli spaces of semistable sheaves on K3 surfaces, which identifies the cotangent bundle of a moduli space with its dual. In this talk I will describe the cotangent complex of a possibly singular moduli space, viewed as an Artin stack, and show that it shares a similar duality property as in the case of a smooth moduli space. |