English

Eigenvalue Coincidences and $K$-orbits, I

Algebraic Geometry 2013-04-26 v2 Representation Theory

Abstract

We study the variety g(l)\mathfrak{g}(l) consisting of matrices xgl(n,\C)x \in \mathfrak{gl}(n,\C) such that xx and its n1n-1 by n1n-1 cutoff xn1x_{n-1} share exactly ll eigenvalues, counted with multiplicity. We determine the irreducible components of g(l)\mathfrak{g}(l) by using the orbits of GL(n1,\C)GL(n-1,\C) on the flag variety \Bn\B_n of gl(n,\C)\mathfrak{gl}(n,\C). More precisely, let b\Bn\mathfrak{b} \in \B_n be a Borel subalgebra such that the orbit GL(n1,\C)bGL(n-1,\C)\cdot \mathfrak{b} in \Bn\B_n has codimension ll. Then we show that the set Y\fb:={\Ad(g)(x):xbg(l),gGL(n1,\C)}Y_{\fb}:= \{\Ad(g)(x): x\in \mathfrak{b} \cap \mathfrak{g}(l), g\in GL(n-1,\C)\} is an irreducible component of g(l)\mathfrak{g}(l), and every irreducible component of of g(l)\mathfrak{g}(l) is of the form YbY_{\mathfrak{b}}, where b\mathfrak{b} lies in a GL(n1,\C)GL(n-1,\C)-orbit of codimension ll. An important ingredient in our proof is the flatness of a variant of a morphism considered by Kostant and Wallach, and we prove this flatness assertion using ideas from symplectic geometry.

Keywords

Cite

@article{arxiv.1303.6661,
  title  = {Eigenvalue Coincidences and $K$-orbits, I},
  author = {Mark Colarusso and Sam Evens},
  journal= {arXiv preprint arXiv:1303.6661},
  year   = {2013}
}

Comments

17 pages

R2 v1 2026-06-21T23:48:46.775Z