Gorenstein homological dimension and some invariants of groups
Abstract
For any group G, the Gorenstein homological dimension GhdRG is defined to be the Gorenstein flat dimension of the coefficient ring R, which is considered as an RG-module with trivial group action. We prove that GhdRG < ∞ if and only if the Gorenstein flat dimension of any RG-module is finite, if and only if there exists an R-pure RG-monic R→ A with A being R-flat and GhdRG = fdRGA, where R is a commutative ring with finite Gorenstein weak global dimension. As applications, properties of Ghd on subgroup, quotient group, extension of groups as well as Weyl group are investigated. Moreover, we compare the relations between some invariants such as sfliRG, silfRG, spliRG, silpRG, and Gorenstein projective, Gorenstein flat and PGF dimensions of RG-modules; a sufficient condition for Gorenstein projective-flat problem over group rings is given.
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