Difference between revisions of "Algebraic Geometry Seminar Fall 2011"
|Line 136:||Line 136:|
''Canonical Hilbert space: Why? How? and its Categorification''
''Canonical Hilbert space: Why? How? and its Categorification''
Revision as of 22:02, 28 November 2011
The seminar meets on Fridays at 2:25 pm in Van Vleck B215.
The schedule for the previous semester is here.
|Sep. 23||Yifeng Liu (Columbia)||Enhanced Grothendieck's operations and base change theorem for
sheaves on Artin stacks
|Sep. 30||Matthew Ballard (UW-Madison)||You got your Hodge Conjecture in my matrix factorizations||(local)|
|Oct. 7||Zhiwei Yun (MIT)||Cohomology of Hilbert schemes of singular curves||Shamgar Gurevich|
|Oct. 14||Javier Fernández de Bobadilla (Instituto de Ciencias Matematicas, Madrid)||Nash problem for surfaces||L. Maxim|
|Oct. 21||Andrei Caldararu (UW-Madison)||The Hodge theorem as a derived self-intersection||(local)|
|Nov. 11||John Francis (Northwestern)||Integral transforms and Drinfeld centers in derived algebraic geometry||Andrei Caldararu|
|Dec. 2||Shamgar Gurevich (Madison)||Canonical Hilbert Space: Why? How? and its Categorification|
|Dec. 9||Sean Paul (Madison)||Semistable pairs and quasi-closed orbits|
|March 16||Weizhe Zheng (Columbia)||TBD||Tonghai Yang|
|March 23||Ryan Grady (Notre Dame)||Twisted differential operators as observables in QFT.||Caldararu|
|May 4||Mark Andrea de Cataldo (Stony Brook)||TBA||Maxim|
You got your Hodge Conjecture in my matrix factorizations
Abstract: I will describe how to prove some new cases of Hodge conjecture using the following tools: categories of graded matrix factorizations, the homotopy category of dg-categories, Orlov's Calabi-Yau/Landau-Ginzburg correspondence, Kuznetsov's relationship between the derived categories of a certain K3 surface and the Fermat cubic fourfold, and Hochschild homology. This is joint work with David Favero (Wien) and Ludmil Katzarkov (Miami/Wien).
Cohomology of Hilbert schemes of singular curves
Abstract: For a smooth curve, the Hilbert schemes are just symmetric powers of the curve, and their cohomology is easily computed by the H^1 of the curve. This is known as Macdonald's formula. In joint work with Davesh Maulik, we generalize this formula to curves with planar singularities (which was conjectured by L.Migliorini). In the singular case, the compactified Jacobian will play an important role in the formula, and we make use of Ngo's technique in his celebrated proof of the fundamental lemma.
Javier Fernández de Bobadilla
Nash problem for surfaces
The space of arcs through the singular set of an algebraic variety has a infinite dimensional scheme structure. In the late sixties Nash proved that it has finitely many irreducible components. He defined a natural mapping from this set of irreducible components to the set of essential divisors of a resolution of singularities. Roughly speaking the set of essential divisors is the set of irreducible components of the exceptional divisor of a resolution whose birational transform is an irreducible component of the exceptional divisor of any other resolution.
Nash proved that this mapping is injective and proposed to study its bijectivity. In 2003 S. Ishii and J. Kollar gave a counterexample to the surjectivity in dimension at least 4. Recently, in a joint work with M. Pe Pereira, the speaker has settled the bijectivity for surfaces. In this talk I will explain the proof.
The Hodge theorem as a derived self-intersection
The Hodge theorem is one of the most important results in complex geometry. It asserts that for a complex projective variety X the topological invariants H^*(X, C) can be refined to new ones that reflect the complex structure. The traditional statement and proof of the Hodge theorem are analytic. Given the multiple applications of the Hodge theorem in algebraic geometry, for many years it has been a major challenge to eliminate this analytic aspect and to obtain a purely algebraic proof of the Hodge theorem. An algebraic formulation of the Hodge theorem has been known since Grothendieck's work in the early 1970's. However, the first purely algebraic (and very surprising) proof was obtained only in 1991 by Deligne and Illusie, using methods involving reduction to characteristic p. In my talk I shall try to explain their ideas, and how recent developments in the field of derived algebraic geometry make their proof more geometric.
Integral transforms and Drinfeld centers in derived algebraic geometry
For a finite group G, conjugation invariant vector bundles on G have a universal property with respect to Rep(G): they form its Drinfeld center. Joint work with David Ben-Zvi and David Nadler generalizes this result, extending work of Hinich, in the setting of derived algebraic geometry. We describe a generalization of the Drinfeld center for a monoidal stable infinity category as a Hochschild cohomology category. For quasi-coherent sheaves on a perfect stack X, we prove that its center is equivalent to sheaves on the derived loop space LX. The structure of this category of sheaves defines an extended 2-dimensional topological quantum field theory.
Canonical Hilbert space: Why? How? and its Categorification
There is an idea in the mathematical physics community that quantization should be a functorial procedure. Our motivation in this talk is to show an example of such a procedure, answering a question of Kazhdan. I will describe a construction of an explicit quantization functor from the category SYMP of finite-dimensional symplectic vector spaces over finite fields to the category of finite-dimensional complex vector spaces. As a by product we will for a fixed symplectic space V an Hilbert space H(V) acted upon by the symplectic group Sp(V). This is called the canonical realization of the Weil representation.
The main idea in the construction of our functor is to overcome the traditional choice of a Lagrangian that appears i classical construction in the field of geometric quantization. For doing this we will explain the Grothendieck geometrization procedure, replacing sets by algebraic varieties, and function theoretic construction by sheaf theoretic operations. In particular, I will explain the use of "Perverse Extension" to improve on the standard constructions that appear in the literature.
Time permits, I will explain the categorification, or sign problem, which appears naturally in our setting. This categorification problem was formulated by Bernstein and Deligne, and was solved recently with the help of Ofer Gabber (IHES). I will speak on it in the future.
Joint work with Ronny Hadani (Austin).
I will assume only knowledge of very elementary representation theory.