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(STRONGLY) GORENSTEIN FLAT MODULES OVER GROUP RINGS
Part of:
Modules, bimodules and ideals
Rings and algebras arising under various constructions
Connections with homological algebra and category theory
Published online by Cambridge University Press: 17 December 2013
Abstract
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Let 
$\Gamma $ be a group and 
${\Gamma }^{\prime } $ be a subgroup of 
$\Gamma $ of finite index. Let 
$M$ be a 
$\Gamma $-module. It is shown that 
$M$ is (strongly) Gorenstein flat if and only if it is (strongly) Gorenstein flat as a 
${\Gamma }^{\prime } $-module. We also provide some criteria in which the classes of Gorenstein projective and strongly Gorenstein flat 
$\Gamma $-modules are the same.
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- Copyright ©2013 Australian Mathematical Publishing Association Inc.
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