On Gorenstein homological dimension of groups
Abstract
Let G be a group and R be a ring. We define the Gorenstein homological dimension of G over R, denoted by GhdRG, as the Gorenstein flat dimension of trivial RG-module R. It is proved that GhdSG ≤ GhdRG for any flat extension of commutative rings R→ S; in particular, GhdRG is a refinement of GhdZG if R is Z-torsion-free. We show a Gorenstein homological version of Serre's theorem, i.e. GhdRG = GhdRH for any subgroup H of G with finite index. As an application, G is a finite group if and only if GhdRG = 0; this is different from the fact that the homological dimension of any non-trivial finite group is infinity.
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