English

Essentially orthogonal subspaces

Functional Analysis 2017-01-16 v1

Abstract

We study the set C{\cal C} consisting of pairs of orthogonal projections P,QP,Q acting in a Hilbert space H{\cal H} such that PQPQ is a compact operator. These pairs have a rich geometric structure which we describe here. They are parted in three subclasses: C0{\cal C}_0 which consists of pairs where PP or QQ have finite rank, C1{\cal C}_1 of pairs such that QQ lies in the restricted Grassmannian (also called Sato Grassmannian) of the polarization H=N(P)R(P){\cal H}=N(P)\oplus R(P), and C{\cal C}_\infty. Belonging to this last subclass one has the pairs PIf=χIf,  QJf=(χJf^) ˇ,  fL2(Rn), P_If=\chi_If ,\ \ Q_Jf= \left(\chi_J \hat{f}\right)\check{\ } , \ \ f\in L^2(\mathbb{R}^n), where I,JRnI, J\subset \mathbb{R}^n are sets of finite Lebesgue measure, χI,χJ\chi_I, \chi_J denote the corresponding characteristic functions and  ^, ˇ\hat{\ } , \check{\ } denote the Fourier-Plancherel transform L2(R2)L2(R2)L^2(\mathbb{R}^2)\to L^2(\mathbb{R}^2) and its inverse. We characterize the connected components of these classes: the components of C0{\cal C}_0 are parametrized by the rank, the components of C1{\cal C}_1 are parametrized by the Fredholm index of the pairs, and C{\cal C}_\infty is connected. We show that these subsets are (non complemented) differentiable submanifolds of B(H)×B(H){\cal B}({\cal H})\times {\cal B}({\cal H}).

Keywords

Cite

@article{arxiv.1701.03737,
  title  = {Essentially orthogonal subspaces},
  author = {Esteban Andruchow and Gustavo Corach},
  journal= {arXiv preprint arXiv:1701.03737},
  year   = {2017}
}
R2 v1 2026-06-22T17:49:45.108Z