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Addits in time ordered product systems
Publication details: New Delhi Springer 2024Edition: Vol.55(1), MarDescription: 412-418pSubject(s): Online resources: In: Indian journal of pure and applied mathematicsSummary: 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.| Item type | Current library | Status | Barcode | |
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School of Engineering & Technology Archieval Section | Not for loan | 2024-1577 |
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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.
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