Essentially orthogonal subspaces
Abstract
We study the set consisting of pairs of orthogonal projections acting in a Hilbert space such that is a compact operator. These pairs have a rich geometric structure which we describe here. They are parted in three subclasses: which consists of pairs where or have finite rank, of pairs such that lies in the restricted Grassmannian (also called Sato Grassmannian) of the polarization , and . Belonging to this last subclass one has the pairs where are sets of finite Lebesgue measure, denote the corresponding characteristic functions and denote the Fourier-Plancherel transform and its inverse. We characterize the connected components of these classes: the components of are parametrized by the rank, the components of are parametrized by the Fredholm index of the pairs, and is connected. We show that these subsets are (non complemented) differentiable submanifolds of .
Cite
@article{arxiv.1701.03737,
title = {Essentially orthogonal subspaces},
author = {Esteban Andruchow and Gustavo Corach},
journal= {arXiv preprint arXiv:1701.03737},
year = {2017}
}