Interpolation theorems for conjugations and applications
Abstract
Let be a separable complex Hilbert space. A conjugate-linear map is called a conjugation if it is an involutive isometry. In this paper, we focus on the following interpolation problems: Let and be orthonormal sets of vectors in , and let be a set of mutually commuting normal operators. We seek to determine under which conditions there exists a conjugation on such that \begin{enumerate}[\rm (a)] \item and for all and ; or \item and for all and . \end{enumerate} We provide complete answers to problems (a) and (b) using the spectral projections of normal operators. Our results are then applied to the study of complex symmetric and skew symmetric operators, as well as to the characterization of hyperinvariant subspaces of normal operators through conjugations.
Cite
@article{arxiv.2406.12994,
title = {Interpolation theorems for conjugations and applications},
author = {Zouheir Amara},
journal= {arXiv preprint arXiv:2406.12994},
year = {2024}
}