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FINITE MODULES OF FINITE INJECTIVE DIMENSION OVER A NOETHERIAN ALGEBRA
Published online by Cambridge University Press: 23 May 2001
Abstract
Let R be a commutative Noetherian ring. Let [Pscr ](R) (respectively, [Iscr ](R)) be the category of all finite R-modules of finite projective (respectively, injective) dimension. Sharp [9] constructed a category equivalence between [Iscr ](R) and [Pscr ](R) for certain Cohen–Macaulay local rings R. Thus many properties about finite modules of finite projective dimension can be connected with those of finite injective dimension through this equivalence.
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- © The London Mathematical Society 2001
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