Real and symmetric matrices
Abstract
We construct a family of involutions on the space of matrices with real eigenvalues interpolating the complex conjugation and the transpose. We deduce from it a stratified homeomorphism between the space of real matrices with real eigenvalues and the space of symmetric matrices with real eigenvalues, which restricts to a real analytic isomorphism between individual -adjoint orbits and -adjoint orbits. We also establish similar results in more general settings of Lie algebras of classical types and quiver varieties. To this end, we prove a general result about involutions on hyper-K\"ahler quotients of linear spaces. We provide applications to the (generalized) Kostant-Sekiguchi correspondence, singularities of real and symmetric adjoint orbit closures, and Springer theory for real groups and symmetric spaces.
Cite
@article{arxiv.2006.10279,
title = {Real and symmetric matrices},
author = {Tsao-Hsien Chen and David Nadler},
journal= {arXiv preprint arXiv:2006.10279},
year = {2020}
}
Comments
37 pages, minor expository changes