Local commutants and ultrainvariant subspaces
Abstract
For an operator on a complex Banach space and a closed subspace , the local commutant of at is the set of all operators on such that for every . It is clear that is a closed linear space of operators, however it is not an algebra, in general. For a given , we show that is an algebra if and only if the largest subspace such that is invariant for every operator in . We say that these are ultrainvariant subspaces of . For several types of operators we prove that there exist non-trivial ultrainvariant subspaces. For a normal operator on a Hilbert space, every hyperinvariant subspace is ultrainvariant. On the other hand, the lattice of all ultrainvariant subspaces of a non-zero nilpotent operator can be strictly smaller than the lattice of all hyperinvariant subspaces.
Keywords
Cite
@article{arxiv.2102.01028,
title = {Local commutants and ultrainvariant subspaces},
author = {Janko Bračič},
journal= {arXiv preprint arXiv:2102.01028},
year = {2021}
}