Eigenvalue Coincidences and $K$-orbits, I
Algebraic Geometry
2013-04-26 v2 Representation Theory
Abstract
We study the variety consisting of matrices such that and its by cutoff share exactly eigenvalues, counted with multiplicity. We determine the irreducible components of by using the orbits of on the flag variety of . More precisely, let be a Borel subalgebra such that the orbit in has codimension . Then we show that the set is an irreducible component of , and every irreducible component of of is of the form , where lies in a -orbit of codimension . 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