November 22, 2024
Ali Bagheri-Bardi

Ali Bagheri-Bardi

Academic Rank: Associate professor
Address:
Degree: Ph.D in Pure Math
Phone: 09125888130
Faculty: Faculty of Intelligent Systems and Data Science

Research

Title The role of the algebraic structure in Wold-type decomposition
Type Article
Keywords
compression; contraction; partial isometry; power partial isometry; shift; truncated shift
Journal FORUM MATHEMATICUM
DOI https://doi.org/10.1515/forum-2020-0362
Researchers Ali Bagheri-Bardi (First researcher) , Zbigniew Burdak (Second researcher) , Akram Elyaspour (Third researcher)

Abstract

In recent works [G. A. Bagheri-Bardi, A. Elyaspour and G. H. Esslamzadeh, Wold-type decompositions in Baer ∗ -rings, Linear Algebra Appl. 539 2018, 117–133] and [G. A. Bagheri-Bardi, A. Elyaspour and G. H. Esslamzadeh, The role of algebraic structure in the invariant subspace theory, Linear Algebra Appl. 583 2019, 102–118], the algebraic analogues of the three major decomposition theorems of Wold, Nagy–Foiaş–Langer and Halmos–Wallen were established in the larger category of Baer * -rings. The results have their versions for commuting pairs in von Neumann algebras. In the corresponding proofs, both norm and weak operator topologies are heavily involved. In this work, ignoring topological structures, we give an algebraic approach to obtain them in Baer * -rings.