Self-dual Grassmannian, Wronski map, and representations of glN, sp2r, so2r+1

Abstract

We define a glN-stratification of the Grassmannian of N planes Gr(N,d). The glN-stratification consists of strata labeled by unordered sets =(λ(1),…,λ(n)) of nonzero partitions with at most N parts, satisfying a condition depending on d, and such that (i=1n Vλ(i))slN 0. Here Vλ(i) is the irreducible glN-module with highest weight λ(i). We show that the closure of a stratum is the union of the strata , =((1),…,(m)), such that there is a partition \I1,…,Im\ of \1,2,…,n\ with HomglN (V(i), j∈ IiVλ(j))≠ 0 for i=1,…,m. The glN-stratification of the Grassmannian agrees with the Wronski map. We introduce and study the new object: the self-dual Grassmannian sGr(N,d)⊂ Gr(N,d). Our main result is a similar gN-stratification of the self-dual Grassmannian governed by representation theory of the Lie algebra g2r+1:=sp2r if N=2r+1 and of the Lie algebra g2r:=so2r+1 if N=2r.