Invariant basis number of the ring of Morita context

Chinese Science Bulletin

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Cohn, P. M., Some remarks on the invariant basis property,Topology, 1966, 5: 215.
Article Google Scholar
McConnell, J. C., Robson, J. C..Noncommutation Noetherian Rings. New York: Wiley-Interscience, 1987
Google Scholar
Hao Zhifeng. Tong Wenting, Global dimension of ring\(T = \left( {\begin{array}{*{20}c} R & M \\ N & S \\\end{array}} \right)_{(\theta , \psi )} \) Sciencein China, Ser. A, 1995, 38: 1025.
Google Scholar
Rotman, J. J.,An Introduction to Homological Algebra, New York: Academic Press, 1979.
Google Scholar
Cohn, P. M.,Algebra, Vol. 2, New York: John Wiley and Sons, 1977.
Google Scholar
Tong Wenting, Some results on IBN rings,J. of Nunjing Univ. Math. Biquarterly (in Chinese),1984, 1: 217.
Google Scholar

Department of Applied Mathematics, South China University of Technology, 510641, Guangzhou, China
Zhifeng Hao

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Zhifeng Hao
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Hao, Z. Invariant basis number of the ring of Morita context. Chin.Sci.Bull. 42, 633–636 (1997). https://doi.org/10.1007/BF03182638

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