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Abstract
Many properties of Elementary operators, including spectrum, numerical ranges, compactness, rank, and norm have been studied in depth and some results have been obtained. However, little has been done in determining the norm of finite length elementary operator in tensor product of C*-algebras. The norm of basic elementary operator in tensor product of C*-algebras have been determined and results obtained. This paper determines the norm of finite length elementary operator in a tensor product of C*-algebras. More precisely, the bounds of the norm of finite length elementary operator in a tensor product of C*-algebras are investigated. The paper employs the techniques of tensor products and finite rank operators to express the norm of an elementary operator in terms of its coefficient operators.
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References
2. Daniel, B., Musundi, S., and Ndungu, K. (2023). Application of Maximal Numerical Range on Norm of Elementary Operator of length Two in a Tensor Product. International Journal of Mathematics and Computer Research, 11 :3837-3842.
3. Kawira, E., Denis, N., and Sammy, W. (2018). On Norm of Elementary Operator of finite length in a C∗-algebra. Journal of Progressive Research in Mathematics, 14 :2282-2288.
4. King’ang’i, D. (2017). On Norm of Elementary Operator of length two. International Journal of Science and Innovation Mathematics Research, 5 :34-38.
5. King’ang’i, D., Agure, J., and Nyamwala, F. (2014). On Norm of Elementary Operator .Advance in Pure Mathematics, 4(2014) :309-316.
6. Muiruri, P., Denis, N., and Sammy, W. (2018). On Norm of Basic Elementary Operator in a Tensor Product. International Journal of Science and Innovation Mathematics Research, 6(6) :15-22.
7. Okelo, N., and Agure, J. (2011). A two Sided Multiplication Operator Norm. General Mathematics Notes, 2 :18-23.
8. Timoney, R. (2001). Norm of Elementary Operator. Bulletin of the Irish Mathematical Society, 46 :13-17