Joint spectrum shrinking maps on projections
Abstract
Let be a finite dimensional complex Hilbert space with dimension and the set of projections on . Let be a surjective map. We show that shrinks the joint spectrum of any two projections if and only if it is joint spectrum preserving for any two projections and thus is induced by a ring automorphism on in a particular way. In addition, for an arbitrary , shrinks the joint spectrum of any projections if and only if it is induced by a unitary or an anti-unitary. Assume that is a surjective map on the Grassmann space of rank one projections. We show that is joint spectrum preserving for any rank one projections if and only if it can be extended to a surjective map on which is spectrum preserving for any two projections. Moreover, for any , is joint spectrum shrinking for any rank one projections if and only if it is induced by a unitary or an anti-unitary.
Cite
@article{arxiv.2212.12895,
title = {Joint spectrum shrinking maps on projections},
author = {Wenhua Qian and Dandan Xiao and Tanghong Tao and Wenming Wu and Xin Yi},
journal= {arXiv preprint arXiv:2212.12895},
year = {2022}
}
Comments
14 pages