Projectively coresolved Gorenstein flat dimension of groups

Abstract

In this paper, we introduce and study the projectively coresolved Gorenstein flat dimension of a group G over a commutative ring R and we prove that this dimension enjoys all the properties of the cohomological and the Gorenstein cohomological dimension. We also provide good estimations for the Gorenstein global dimension of RG in terms of this dimension and the Gorenstein global dimension of R. Moreover, we study special cases of groups, such as ▪-groups, and show that for such a group every Gorenstein projective RG-module is Gorenstein flat when the global dimension of R is finite.