Addits in time ordered product systems
Vujošević, Biljana
Addits in time ordered product systems - Vol.55(1), Mar - New Delhi Springer 2024 - 412-418p.
In this paper we observe the set of all continuous additive units (continuous addits) of the vacuum unit in the time ordered product system , where F is a two-sided Hilbert module over the -algebra of all bounded operators acting on a Hilbert space of finite dimension. We prove that the set of all continuous addits of and are isomorphic as Hilbert modules.
Humanities and Applied Sciences
Addits in time ordered product systems - Vol.55(1), Mar - New Delhi Springer 2024 - 412-418p.
In this paper we observe the set of all continuous additive units (continuous addits) of the vacuum unit in the time ordered product system , where F is a two-sided Hilbert module over the -algebra of all bounded operators acting on a Hilbert space of finite dimension. We prove that the set of all continuous addits of and are isomorphic as Hilbert modules.
Humanities and Applied Sciences