Journées SL2R à Louvain-la-Neuve 2022
de
jeudi 8 décembre 2022 (13:30)
à
vendredi 9 décembre 2022 (13:00)
lundi 5 décembre 2022
mardi 6 décembre 2022
mercredi 7 décembre 2022
jeudi 8 décembre 2022
13:30
Accueil
Accueil
13:30 - 14:00
Room: B-203
14:00
From group cohomology to pentagonal cohomology via quantization
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Victor Gayral
From group cohomology to pentagonal cohomology via quantization
Victor Gayral
14:00 - 14:50
Room: B-203
15:00
Dirac operators for the BGG category O
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Spyros Afentoulidis
Dirac operators for the BGG category O
Spyros Afentoulidis
15:00 - 15:50
Room: B-203
Dirac operators were used in the context of Representation Theory by Parthasarathy in 1972, as invariant first order differential operators acting on sections of homogeneous vector bundles over symmetric spaces $G/K$ in order to obtain realizations of the discrete series representations of $G$. In a series of lectures in 1997, Vogan introduced an algebraic analogue of Parthasarthy's Dirac operator. By using this operator, he defined the so-called Dirac cohomology of $(\mathfrak{g},K)$-modules $X$ and conjectured a relation between the Dirac cohomology of $X$ and its infinitesimal character, proved by Huang and Pandžić in 2001. Since then, Dirac cohomology has been computed for various families of modules, including highest weight modules, $A_{\mathfrak q}(\lambda)$ modules, generalized Enright-Varadarajan modules, unipotent representations, etc. In this talk, we will present some results concerning Dirac operators for modules belonging to the standard BGG category $\mathcal{O}$ of a complex semisimple Lie algebra $\mathfrak{g}$. This category consists of the finitely generated, locally $\mathfrak{n}$-finite weight modules of $\mathfrak{g}$ and seems to be the "correct" module category to study questions raised by Verma concerning composition series and embeddings of Verma modules, and Jantzen concerning his so-called translation functors.
16:00
Pause
Pause
16:00 - 16:30
Room: B-203
16:30
Aspects combinatoires et analytiques d'analogues quantiques de nombres
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Sophie Morier-Genoud
Aspects combinatoires et analytiques d'analogues quantiques de nombres
Sophie Morier-Genoud
16:30 - 17:20
Room: B-203
Dans un travail récent avec Valentin Ovsienko, nous avons introduit des q-analogues des nombres rationnels. Il s’agit de fractions rationnelles à coefficients entiers s’obtenant naturellement par une approche combinatoire. Un remarquable phénomène de stabilisation permet d'étendre la q-déformation à tout nombre réel menant à des séries formelles à coefficients entiers. Si à l’origine des q-rationnels on peut remonter à des calculs de polynômes de Jones pour des invariants de noeuds, les q-nombres dévoilent de remarquables propriétés permettant de revisiter des classiques de théorie des nombres (Fibonacci, Pell, Farey, Markov, Hurwitz,…). Nous discuterons divers aspects combinatoires et analytiques de ces q-nombres en présentant des résultats basés sur plusieurs collaborations avec L. Leclere, V. Ovsienko, et A. Veselov.
19:30
Repas Restaurant
Repas Restaurant
19:30 - 20:30
vendredi 9 décembre 2022
09:00
On graded and ungraded associativity
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Wolfgang Bertram
On graded and ungraded associativity
Wolfgang Bertram
09:00 - 09:50
Room: B-203
For a long time, by now, I have been working on geometries related to associative and non-associative algebras. First of all, I will discuss some aspects of associative structures, such as *associative geometries*, defined in work with M. Kinyon, <https://arxiv.org/abs/0903.5441>. Second, I will propose a framework of *graded associative* structures, following <https://arxiv.org/abs/2109.00878v1>. This graded framework grew out of the very general, functorial and ungraded approach to differential calculus <https://arxiv.org/abs/2006.04452> -- my hope is that this functorial approach would make sense also in the graded framework, thus opening a way to a functorial super-calculus. However, for the time being, this rather is conjectural and speculative -- see also <http://wolfgang.bertram.perso.math.cnrs.fr/WB-PCS.pdf>
10:00
Deformed oscillators and fractional spin fields
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Nicolas Boulanger
Deformed oscillators and fractional spin fields
Nicolas Boulanger
10:00 - 10:50
Room: B-203
11:00
Pause
Pause
11:00 - 11:30
Room: B-203
11:30
Hyperbolic locally compact groups of Type I
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Pierre-Emmanuel Caprace
Hyperbolic locally compact groups of Type I
Pierre-Emmanuel Caprace
11:30 - 12:20
Room: B-203
$SL(2,R)$ is an example of a hyperbolic locally compact group, i.e. a locally compact group that is Gromov hyperbolic with respect to the word metric associated with a compact generating set. This talk, based on joint work with Mehrdad Kalantar and Nicolas Monod, is devoted to the structure of hyperbolic locally compact groups that are of Type I. The Type I property formalizes the condition that their unitary representations are well behaved. I will discuss a general conjecture predicting that every Type I locally compact group shares a key structural feature with $SL(2, R)$, and outline a proof in the case of hyperbolic locally compact groups containing a uniform lattice.