Morita equivalence for infinite matrix rings |
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Authors: | Xu Yonghua Kar Ping Shum |
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Affiliation: | 1. Institute of Mathematics , Fudan University , Shanghai, China E-mail: yxu@ms.fudan.sh.cn;2. Department of Mathematics , The Chinese University of Hong Kong , Hong Kong, China E-mail: kpshum@math.cuhk.edu.hk |
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Abstract: | In this paper, weak distinguished subcategory and distinguished subcategory of modules are introduced. Left(right) local unital rings are particularly considered. Also, representable equivalent functors between categories. By using the replacement techniques of modules, a general theory of Morita equivalence for infinite matrix rings is established. This theory not only extends the classical Morita theory of equivalence from finite matrix rings to infinite matrix rings and also contains some new results which are useful in studying the algebraic structures for infinite matrix rings. Some results of classical Morita theory are included as its special cases. |
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