On co-semihereditary rings |
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Authors: | Weimin Xue |
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Institution: | (1) Department of Mathematics, Fujian Normal University, 350007 Fuzhou, China |
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Abstract: | A ringR is left co-semihereditary (strongly left co-semihereditary) if every finitely cogenerated factor of a finitely cogenerated
(arbitrary) injective leftR-module is injective. A left co-semihereditary ring, which is not strongly left co-semihereditary, is given to answer a question
of Miller and Tumidge in the negative. If
R
U
S
defines a Morita duality,R is proved to be left co-semihereditary (left semihereditmy) if and only ifS is right semihereditary (right co-semihereditary). Assuming thatS⩾R is an almost excellent extension,S is shown to be (strongly) right co-semihereditary if and only ifR is (strongly) right co-semihereditary.
Project supported by the National Natural Science Foundation of China. |
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Keywords: | (strongly) co-semihereditary rings and modules Morita duality almost excellent extensions |
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