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Analytical Study of Hilbert Space and Algebra of Operators
U.K. Srivastava1, L.K. Roy2, Binod Prasad3, C.D. Pathak4, & Surendra Ray5
1. R.S.S. College, Chochahan, P.O.:- Aniruddh Belsar, Dist.- Muzaffarpur – 844111, B.R.A. Bihar University, Muzaffarpur – 842001,
Bihar, India.
2. T.P. Varma College, Narkatiaganj, West Champaran – 845455 , B.R.A. Bihar University, Muzaffarpur – 842001 , Bihar, India.
3. T.R.M. Campus, Birganj, Parsa, Nepal, Tribhuvan University, Nepal.
4. R.R.M. Campus, Janakpurdham, Nepal, Tribhuvan University, Nepal.
5. R.R.M. Campus, Janakpurdham, Nepal, Tribhuvan University, Nepal.
Abstract: This present paper deals with the study of Hilbert Space and Algebra of Operators. Here, we consider R as additive group of reals with discrete topology and several ways of constructing C* – algebras Canonically associated with R and π, The Universal representation of R on Hilbert Space H, it is proved in this paper that all C*- algebras homomorphism and representation will be * – preserving.
Keywords: Hilbert space, Tensor product, C* – tensor norms, C* – algebras, Normal and Binormal norms, W*- algebras.Pages: 182 – 186 | Full PDF Paper