Representation Theory Seminar (past)
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Tue, 14/05 15:45 |
Kevin McGerty (Oxford) |
Representation Theory Seminar  |
L3 |
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Tue, 14/05 14:00 |
Tom Nevins (Illinois) |
Representation Theory Seminar |
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Thu, 09/05 14:00 |
Christopher Dodd |
Representation Theory Seminar |
L3 |
| Recently, there has been a great deal of interest in the theory of modules over algebraic quantizations of so-called symplecticresolutions. In this talk I'll discuss some new work -joint, and very much in progress- that open the door to giving a geometric description to certain categories of such modules; generalizing classical theorems of Kashiwara and Bernstein in the case of D-modules on an algebraic variety. | |||
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Thu, 02/05 14:00 |
Ed Segal (Imperial College London) |
Representation Theory Seminar |
L2 |
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A Landau-Ginzburg B-model is a smooth scheme $X$, equipped with a global function $W$. From $(X,W)$ we can construct a category $D(X,W)$, which is called by various names, including ‘the category of B-branes’. In the case $W=0$ it is exactly the derived category $D(X)$, and in the case that $X$ is affine it is the category of matrix factorizations of $W$. There has been a lot of foundational work on this category in recent years, I’ll describe the most modern and flexible approach to its construction. I’ll then interpret Nick Addington’s thesis in this language. We’ll consider the case that $W$ is a quadratic form on a vector bundle, and the corresponding global version of Knorrer periodicity. We’ll see that interesting gerbe structures arise, related to the bundle of isotropic Grassmannians. |
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Thu, 07/03 14:00 |
Ana Paula Santana (University of Coimbra) |
Representation Theory Seminar |
L3 |
| Using the Borel-Schur algebra, we construct explicit characteristic-free resolutions for Weyl modules for the general linear group. These resolutions provide an answer to the problem, posed in the 80's by A. Akin and D. A. Buchsbaum, of constructing finite explicit and universal resolutions of Weyl modules by direct sums of divided powers. Next we apply the Schur functor to these resolutions and prove a conjecture of Boltje and Hartmann on resolutions of co-Specht modules. This is joint work with I. Yudin. | |||
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Thu, 28/02 14:00 |
Ivan Fesenko |
Representation Theory Seminar |
L3 |
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Thu, 21/02 14:00 |
Rowena Paget (University of Canterbury) |
Representation Theory Seminar |
L3 |
| The symmetric group S_{mn} acts naturally on the collection of set partitions of a set of size mn into n sets each of size m, and the resulting permutation character is the Foulkes character. These characters are the subject of the longstanding Foulkes Conjecture. In this talk, we define a deflation map which sends a character of the symmetric group S_{mn} to a character of S_n. The values of the images of the irreducible characters under this map are described combinatorially in a rule which generalises two well-known combinatorial rules in the representation theory of symmetric groups, the Murnaghan-Nakayama formula and Young's rule. We use this in a new algorithm for computing irreducible constituents of Foulkes characters and verify Foulkes’ Conjecture in some new cases. This is joint work with Anton Evseev (Birmingham) and Mark Wildon (Royal Holloway). | |||
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Thu, 14/02 14:00 |
Stephane Guillermou (Grenoble) |
Representation Theory Seminar |
L3 |
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Several recent works by D. Tamarkin, D. Nadler, E. Zaslow make use of the microlocal theory of sheaves of M. Kashiwara and P. Schapira to obtain results in symplectic geometry. The link between sheaves on a manifold $M$ and the symplectic geometry of the cotangent bundle of $M$ is given by the microsupport of a sheaf, which is a conic co-isotropic subset of the cotangent bundle. In the above mentioned works properties of a given Lagrangian submanifold $\Lambda$ are deduced from the existence of a sheaf with microsupport $\Lambda$, which we call a quantization of $\Lambda$. In the third talk we will see that $\Lambda$ admits a canonical quantization if it is a "conification" of a compact exact Lagrangian submanifold of a cotangent bundle. We will see how to use this quantization to recover results of Fukaya-Seidel-Smith and Abouzaid on the topology of $\Lambda$. |
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Wed, 13/02 14:00 |
Stephane Guillermou (Grenoble) |
Representation Theory Seminar |
L1 |
| Several recent works by D. Tamarkin, D. Nadler, E. Zaslow make use of the microlocal theory of sheaves of M. Kashiwara and P. Schapira to obtain results in symplectic geometry. The link between sheaves on a manifold $M$ and the symplectic geometry of the cotangent bundle of $M$ is given by the microsupport of a sheaf, which is a conic co-isotropic subset of the cotangent bundle. In the above mentioned works properties of a given Lagrangian submanifold $\Lambda$ are deduced from the existence of a sheaf with microsupport $\Lambda$, which we call a quantization of $\Lambda$. In the second talk we will introduce a stack on $\Lambda$ by localization of the category of sheaves on $M$. We deduce topological obstructions on $\Lambda$ for the existence of a quantization. | |||
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Tue, 12/02 15:45 |
Stephane Guillermou (Grenoble) |
Representation Theory Seminar |
L3 |
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Several recent works by D. Tamarkin, D. Nadler, E. Zaslow make use of the microlocal theory of sheaves of M. Kashiwara and P. Schapira to obtain results in symplectic geometry. The link between sheaves on a manifold $M$ and the symplectic geometry of the cotangent bundle of $M$ is given by the microsupport of a sheaf, which is a conic co-isotropic subset of the cotangent bundle. In the above mentioned works properties of a given Lagrangian submanifold $\Lambda$ are deduced from the existence of a sheaf with microsupport $\Lambda$, which we call a quantization of $\Lambda$. In the first talk we will see that the graph of a Hamiltonian isotopy admits a canonical quantization and we deduce a new proof of Arnold's non-displaceability conjecture. |
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Thu, 31/01 14:00 |
Pierre Schapira (Paris VI) |
Representation Theory Seminar |
L3 |
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Wed, 30/01 14:00 |
Pierre Schapira (Paris VI) |
Representation Theory Seminar |
L1 |
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Tue, 29/01 15:45 |
Pierre Schapira (Paris VI) |
Representation Theory Seminar |
L3 |
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Thu, 24/01 14:00 |
Yuri Bazlov (Manchester University) |
Representation Theory Seminar |
L3 |
| Central extensions of a finite group G correspond to 2-cocycles on G, which give rise to an abelian cohomology group known as the Schur multiplier of G. Recently, the Schur multiplier was defined in a much more general setting of a monoidal category. I will explain how to twist algebras by categorical 2-cocycles and will mention the role of such twists the theory of quantum groups. I will then describe an approach to twisting rational Cherednik algebras by cocycles, and will discuss possible applications of this new construction to the representation theory of these algebras. | |||
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Thu, 17/01 14:00 |
Matthias Krebs (University of East Anglia) |
Representation Theory Seminar |
L3 |
| It has been shown that the Auslander-Reiten-quiver of an indecomposable algebra contains a finite component if and only if A is representation finite. Moreover, selfinjective algebras are representation finite if and only if the tree types of the stable components are given by Dynkin Diagrams. I will present similar results for the Auslander-Reiten-quiver of a functorially finite resolving subcategory Ω. We will see that Brauer-Thrall 1 and Brauer-Thrall 1.5 can be proved for these categories with only little extra effort. Furthermore, a connection between sectional paths in A-mod and irreducible morphisms in Ω will be given. Finally, I will show how all finite Auslander-Reiten-quivers of A-mod or Ω are related to Dynkin Diagrams with a notion similar to the tree type that coincides in a finite stable component. | |||
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Thu, 06/12/2012 17:00 |
Markus Linckelmann (Bloc meeting) |
Representation Theory Seminar |
L2 |
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Thu, 06/12/2012 15:15 |
Radha Kessar |
Representation Theory Seminar |
L3 |
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Thu, 06/12/2012 12:00 |
Petter A. Bergh (Bloc meeting) |
Representation Theory Seminar |
L3 |
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Thu, 29/11/2012 15:00 |
Florian Klein (Oxford) |
Representation Theory Seminar |
L3 |
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Thu, 29/11/2012 14:00 |
Alexandre Bouayad |
Representation Theory Seminar |
L3 |
| We introduce a deformation process of universal enveloping algebras of Borcherds-Kac-Moody algebras, which generalises quantum groups' one and yields a large class of new algebras called coloured Borcherds-Kac-Moody algebras. The direction of deformation is specified by the choice of a collection of numbers. For example, the natural numbers lead to classical enveloping algebras, while the quantum numbers lead to quantum groups. We prove, in the finite type case, that every coloured BKM algebra have representations which deform representations of semisimple Lie algebras and whose characters are given by the Weyl formula. We prove, in the finite type case, that representations of two isogenic coloured BKM algebras can be interpolated by representations of a third coloured BKM algebra. In particular, we solve conjectures of Frenkel-Hernandez about the Langland duality between representations of quantum groups. We also establish a Langlands duality between representations of classical BKM algebras, extending results of Littelmann and McGerty, and we interpret this duality in terms of quantum interpolation. | |||
