English

On Almost-Invariant Subspaces and Approximate Commutation

Functional Analysis 2012-04-23 v1 Operator Algebras

Abstract

A closed subspace of a Banach space \cX\cX is almost-invariant for a collection \cS\cS of bounded linear operators on \cX\cX if for each T\cST \in \cS there exists a finite-dimensional subspace \cFT\cF_T of \cX\cX such that T\cY\cY+\cFTT \cY \subseteq \cY + \cF_T. In this paper, we study the existence of almost-invariant subspaces of infinite dimension and codimension for various classes of Banach and Hilbert space operators. We also examine the structure of operators which admit a maximal commuting family of almost-invariant subspaces. In particular, we prove that if TT is an operator on a separable Hilbert space and if TPPTTP-PT has finite rank for all projections PP in a given maximal abelian self-adjoint algebra \fM\fM then T=M+FT=M+F where M\fMM\in\fM and FF is of finite rank.

Keywords

Cite

@article{arxiv.1204.4621,
  title  = {On Almost-Invariant Subspaces and Approximate Commutation},
  author = {Laurent W. Marcoux and Alexey I. Popov and Heydar Radjavi},
  journal= {arXiv preprint arXiv:1204.4621},
  year   = {2012}
}
R2 v1 2026-06-21T20:52:36.984Z