On transitive operator algebras in real Banach spaces

Kissin, Edward, Shulman, Victor and Turovskii, Yuri V. (2022) On transitive operator algebras in real Banach spaces. Journal of Operator Theory. ISSN 1841-7744 (In Press)

Abstract

We consider weakly closed transitive algebras of operators containing non-zero compact operators in real Banach spaces (Lomonosov algebras). It is shown that they are naturally divided in three classes: the algebras of real, complex and quaternion classes. The properties and characterizations of algebras in each class as well as some useful examples are presented. It is shown that in separable real Hilbert spaces there is a continuum of pairwise non-similar Lomonosov algebras of complex type and of quaternion type.

Documents
8159:42131
[thumbnail of 2022 ARXIVE On Transitive Operator algebras in Real Banach Spaces.pdf]
2022 ARXIVE On Transitive Operator algebras in Real Banach Spaces.pdf - Accepted Version
Restricted to Repository staff only until 28 January 2028.

Download (266kB) | Request a copy
Details
Record
View Item View Item