- Magdalena Boos [Ruhr-Universität Bochum]
Titel: From type A to all classical Lie types: Let's discuss Symmetric Representation Theory
Abstract:
When considering representation theory of quivers, one might
be disappointed that the theory only deals with type A setups, i.e.
general linear groups and their Lie algebras. The notion of a symmetric
quiver was first introduced by Derksen and Weyman in 2002 and allows
considering classical settings in types B, C and D. We give an
introduction to symmetric quiver representations, motivate our interest
in the theory and show first results. This is joint work with G. Cerulli
Irelli.
- Thorsten Heidersdorf [Universität Bonn]
Titel: Deligne categories and complex representations of the finite linear group
Abstract:
Deligne defined symmetric monoidal categories \(Rep(S_t)\), \(Rep(O_t)\) and \(Rep(GL_t)\) (\(t \in \mathbb{C}\) interpolating the finite dimensional representations of \(S_n\), \(GL_n\) and $O_n$ over a field of characteristic zero. Variants and generalizations of these categories have appeared throughout the literature (e.g. by Turaev, Etingof, Knop, Flake-Maassen, Rui-Song,...).
In this talk I will give a survey and then focus on the case of complex representations of the finite linear group \(GL_n(\mathbb{F}_q)\) (previously studied by Knop and Harman-Snowden). I will explain why the corresponding Deligne category is the universal symmetric monoidal category with an \(\mathbb{F}_q\)-linear Frobenius space. Then I will explain how to embed it into an abelian tensor category (its abelian envelope) in a universal way and how these categories relate to representations of \(GL_{\infty}(\mathbb{F}_q)\).
This is joint work with Inna Entova-Aizenbud (Ben-Gurion).
- Nicolas Jacon [Université de Reims Champagne-Ardenne]
Titel: Cores and weights for Ariki-Koike algebras
Abstract:
The weight and the core of a partition are two important notions in the study of the blocks of the symmetric group and its Hecke algebra. In this talk, we show how these two notions can be generalized at the level of multipartitions in the context of Ariki-Koike algebras (joint work with M.Chlouveraki and C.Lecouvey)
- Frank Lübeck [RWTH Aachen]
Titel: Green functions and permutation characters
Abstract:
Green functions of finite reductive groups are class functions on
unipotent elements. They are used to compute the values
of (ordinary) irreducible characters of these groups.
Lusztig and Shoji decribed an algorithm for computing the Green functions as
linear combinations of certain functions which are supported on elements
in a single conjugacy class of the underlying algebraic group. At first
these functions are only determined up to a root of unity factor, but these
factors are now known in almost all cases.
The missing cases are for groups of type \(E_8(q)\) in small characteristic.
In this talk we sketch a solution for the missing cases by computing
values of permutation characters of parabolic subgroups. This extends an
idea of Meinolf Geck.
- Alexander Miller [Universität Wien]
Titel: Foulkes characters
Abstract:
I will talk about certain characters of \(S_n\) called Foulkes
characters. I will describe a geometric approach that works for several
other reflection groups and elucidates all of the classical properties.
I will also discuss several new results for these characters and their
generalizations, along with some recent connections, including the
connection with adding random numbers.
- Benjamin Sambale [Leibniz Universität Hannover]
Titel: Sylow structure from the character table
Abstract:
By the (finally proven) height zero conjecture the character
table of a finite group \(G\) determines whether \(G\) has an abelian Sylow
\(p\)-subgroup \(P\).
We show that this remains true if \(P\) is "close to" or "far from" abelian.
More precisely, each of the following properties is detected from the
character table: \(|P:P'|= p^2\), \(|P:Z(P)|=p^2\), \(P\) has maximal nilpotency
class, \(P\) is minimal non-abelian. This is joint work with G. Navarro and
A. Moretó.
- Damiano Rossi [City, University of London]
Titel: Alternating sums for unipotent characters
Abstract:
Unipotent characters play a fundamental role in representation theory of finite reductive groups. Recently, Broué has suggested a vanishing statement for alternating sums involving unipotent characters in the spirit of Dade's conjecture. We answer Broué's question in the affirmative for linear and symplectic groups.
- Lucas Ruhstorfer [Bergische Universität Wuppertal]
Titel: The Alperin--McKay conjecture and groups of Lie type \(B\) and \(C\)
Abstract:
The Alperin--McKay conjecture is a local-global conjecture in the modular representation theory of finite groups. To prove this conjecture it suffices to verify the so-called inductive Alperin--McKay condition for all finite simple groups. In this talk, we will discuss this inductive condition for simple groups of Lie type $B$ and \(C\). This is joint work with Julian Brough.