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Lie groups and invariant theory
February 23, 2022 17:00, Moscow, Zoom
 


An analogue of Steinberg theory for symmetric pairs

L. Fresse

Université de Lorraine, Nancy
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Abstract: The double flag variety $G/B\times G/B$ of a reductive group $G$ has a finite number of $G$-orbits parametrized by the Weyl group $W$. Relying on moment maps, one gets a map from the Weyl group to the set of nilpotent orbits of $\mathrm{Lie}(G)$, often called the Steinberg map. In type $\mathsf A$, this map can be computed explicitly in terms of classical combinatorial algorithms, namely the Robinson–Schensted correspondence. In this talk, we consider a double flag variety $X=G/P\times K/Q$ associated to a symmetric pair $(G,K)$. Following Steinberg's approach, we define two maps to the sets of nilpotent $K$-orbits of $\mathrm{Lie}(K)$ and of its Cartan complement, respectively. We focus on type $\mathsf{A}\mathrm{III}$, the orbits of $X$ are then parametrized by a set of pairs of partial permutations. We compute the two maps by relying on a combinatorial procedure that extends the classical Robinson–Schensted correspondence.
The talk is based on a joint work with Kyo Nishiyama; see arXiv:2103.08460, IMRN 2022, no. 1, 1–62.

Supplementary materials: notes_2022_02_23.pdf (1.3 Mb)

Language: English
 
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