# Self-dual Grassmannian, Wronski map, and representations of   $\mathfrak{gl}_N$, ${\mathfrak{sp}}_{2r}$, ${\mathfrak{so}}_{2r+1}$

**Authors:** Kang Lu, E. Mukhin, A. Varchenko

arXiv: 1705.02048 · 2025-04-15

## TL;DR

This paper introduces a new stratification of the Grassmannian and self-dual Grassmannian linked to representation theory of Lie algebras, connecting geometric structures with algebraic modules and maps.

## Contribution

It defines a novel $rak{gl}_N$-stratification of the Grassmannian and extends it to the self-dual Grassmannian, revealing deep connections with Lie algebra representations.

## Key findings

- The $rak{gl}_N$-stratification aligns with the Wronski map.
- Closure relations among strata are characterized by tensor product multiplicities.
- A new $rak{g}_N$-stratification of the self-dual Grassmannian is established.

## Abstract

We define a $\mathfrak{gl}_N$-stratification of the Grassmannian of $N$ planes $\mathrm{Gr}(N,d)$. The $\mathfrak{gl}_N$-stratification consists of strata $\Omega_{\mathbf{\Lambda}}$ labeled by unordered sets $\mathbf{\Lambda}=(\lambda^{(1)},\dots,\lambda^{(n)})$ of nonzero partitions with at most $N$ parts, satisfying a condition depending on $d$, and such that $(\otimes_{i=1}^n V_{\lambda^{(i)}})^{\mathfrak{sl}_N}\ne 0$. Here $V_{\lambda^{(i)}}$ is the irreducible $\mathfrak{gl}_N$-module with highest weight $\lambda^{(i)}$. We show that the closure of a stratum $\Omega_{\mathbf{\Lambda}}$ is the union of the strata $\Omega_{\mathbf\Xi}$, $\mathbf{\Xi}=(\xi^{(1)},\dots,\xi^{(m)})$, such that there is a partition $\{I_1,\dots,I_m\}$ of $\{1,2,\dots,n\}$ with $ {\rm {Hom}}_{\mathfrak{gl}_N} (V_{\xi^{(i)}}, \otimes_{j\in I_i}V_{\lambda^{(j)}}\big)\neq 0$ for $i=1,\dots,m$. The $\mathfrak{gl}_N$-stratification of the Grassmannian agrees with the Wronski map.   We introduce and study the new object: the self-dual Grassmannian $\mathrm{sGr}(N,d)\subset \mathrm{Gr}(N,d)$. Our main result is a similar $\mathfrak{g}_N$-stratification of the self-dual Grassmannian governed by representation theory of the Lie algebra $\mathfrak {g}_{2r+1}:=\mathfrak{sp}_{2r}$ if $N=2r+1$ and of the Lie algebra $\mathfrak g_{2r}:=\mathfrak{so}_{2r+1}$ if $N=2r$.

## Full text

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## References

23 references — full list in the complete paper: https://tomesphere.com/paper/1705.02048/full.md

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Source: https://tomesphere.com/paper/1705.02048