Abstracts for Seminar on Algebra, Geometry and Physics

It seems that the most productive, although not comprehensive, modern approach to the theory of quantum integrable systems is the approach based on the concept of quantum group invented by Drinfeld and Jimbo. In this approach all the objects describing the model and related to its integrability originate from the universal R-matrix and the functional relations, principal for the integration procedure, are consequences of the properties of the appropriate representations of the quantum group.

We use wall-crossing for Bridgeland stability conditions to systematically study the birational
geometry of a moduli space M of Gieseker-stable sheaves on a K3 surface. In particular, we show:
- Any K-equivalent birational model of M appears as a moduli of Bridgeland stable objects, such that
the birational transformation is induced by wall-crossing.
- We complete Markman's proof the Kawamata-Morrison cone conjecture on the moveable cone of M.
- We establish the Hassett-Tschinkel/Huybrechts/Sawon conjecture on the existence of birational

One can view the Fermat quotient operations on (algebraic) integers as arithmetic analogues of partial
differential operators acting on functions. This leads to a ``differential calculus over the field with one element".
When the machinery  is applied to arithmetic curves one can  obtain diophantine applications  (e.g. to Heegner points).
When the machinery is applied to rings of Witt vectors one obtains an arithmetic analogue $\Gamma$ for the integers

Abstract: I will explain my recent work on the deformation theory of
Schr\"odinger operator related to a strongly tame section-bundle system
$(M,g,f)$. This is a differential geometric description of
Landau-Ginzburg B model. We can construct the Hodge theory after proving
a key spectrum theorem of the form Schr\"odinger operators, then prove
the stability theorem, and finally we can construct the $tt^*$ geometry
structure on the Hodge bundle of the moduli space. As one application, we
can get Frobenius manifold structure via primitive vector which is given