On modules over valuation domains whose finitely generated submodules are direct sums of cyclics (Q1102330)
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scientific article; zbMATH DE number 4049753
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | On modules over valuation domains whose finitely generated submodules are direct sums of cyclics |
scientific article; zbMATH DE number 4049753 |
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On modules over valuation domains whose finitely generated submodules are direct sums of cyclics (English)
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1988
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Let \({\mathcal C}\) denote the class of all \(R\)-modules over a valuation domain \(R\), all finitely generated submodules of which are direct sums of cyclic \(R\)-modules. The authors prove that a torsion module \(M\) lies in \({\mathcal C}\) (in general, a module M belongs to \({\mathcal C}\) iff its torsion part belongs to \({\mathcal C})\) iff every countably generated submodule of \(M\) is isomorphic to a submodule of a direct sum of uniserial \(R\)-modules, iff \(M\) is a submodule of a pseudo-separable \(R\)-module (\(K\) is pseudo-separable if every finite subset of \(K\) is embeddable in a cyclically pure submodule that is a finite direct sum of uniserial submodules).
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valuation domain
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torsion module
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cyclically pure submodule
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0.9329963
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0.9001992
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0.8964218
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0.89598686
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0.89505726
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0.8886689
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0.8868308
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