On the exactness of flat resolvents |
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| Authors: | Jianlong Chen Nanqing Ding |
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| Institution: | 1. Department of Mathematics and Mechanics , Southeast University , Nanjing, P. R, 210018, China;2. Department of Mathematics , Nanjing University , Nanjing, P. R, 210008, China |
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| Abstract: | Let R be a left coherent ring, FP — idRR the FP — injective dimension of RR and wD(R) the weak global dimension of R. It is shown that 1) FP -idRR < n ( n > 0) if and only if every flat resolvent 0 → M → F° → F1... of a finitely presented right R—module M is exact at F'(i > n?1) if and only if every nth F -cosyzygy of a finitely presented right R — module has a flat preenvelope which is a monomorphism; 2) wD(R) < n (n > 1) if and only if every (n?l)th F-cosyzygy of a finitely presented right R—module has a flat preenvelope which is an epimorphism; 3) wD(R) 0) if and only if every nth F — cosyzygy of a finitely presented right R — module is flat. In particular, left FC rings and left semihereditary rings are characterized |
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