Journal of Operator Theory
Volume 33, Issue 1, Winter 1995 pp. 117-158.
Characterization of Jordan elements in $\Psi*$-algebrasAuthors: Kai Lorentz
Author institution:Fachbereich Mathematik, Johannes Gutenberg Universität, 55099 Mainz, Germany and Universidad del Norte, Departamento de Matemáticas, Barranquilla, Colombia (South America)
Summary: We show that, given a $\Psi*$-algebra $\mathcal A \subseteq L(H)$, H a Hilbert space, and an operator $J \in \mathcal A$ which is a Jordan operator of L(H), then J also admits a Jordan decomposition within $mathcal A$. The constructive proof of this fact indicates that the structure of the projections of a $\Psi*$-algebra is very rich. We use this construction of obtain local similarity cross sections for Jordan elements $J \in \mathcal A$ within the $\Psi*$-algebra $\mathcal A$.
Keywords: Similarity orbits, Jordan operator, $\Psi*$-algebras, pseudo invertibility, local cross sections.
Contents Full-Text PDF