Homological dimension of finitely presented \(G\)-graded modules with graded direct factor\newline \(R/J^g(R)\). (Q1879117)
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scientific article; zbMATH DE number 2101798
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Homological dimension of finitely presented \(G\)-graded modules with graded direct factor\newline \(R/J^g(R)\). |
scientific article; zbMATH DE number 2101798 |
Statements
Homological dimension of finitely presented \(G\)-graded modules with graded direct factor\newline \(R/J^g(R)\). (English)
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22 September 2004
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Let \(R\) be a commutative group graded ring. The concept of a gr-FP-injective dimension of a graded \(R\)-module is defined and used to study global dimensions of the graded ring \(R\). If \(R\) is gr-coherent gr-semilocal with finitely generated graded Jacobson radical \(J^g(R)\), and \(M\) is a finitely presented graded \(R\)-module having \(R/J^g(R)\) as a graded direct factor, relations between the homological dimensions of \(M\) are discussed.
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graded coherent rings
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graded semilocal rings
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gr-FP-injective dimension
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graded Jacobson radical
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graded homological dimensions
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