Gorenstein cohomological dimension and stable categories for groups

Abstract

First we study the Gorenstein cohomological dimension GcdRG of groups G over coefficient rings R, under changes of groups and rings; a characterization for finiteness of GcdRG is given. Some results in literature obtained over the coefficient ring Z or rings of finite global dimension are generalized to more general cases. Moreover, we establish a model structure on the weakly idempotent complete exact category Fib consisting of fibrant RG-modules, and show that the homotopy category Ho(Fib) is triangle equivalent to both the stable category Cof(RG) of Benson's cofibrant modules, and the stable module category StMod(RG). The relation between cofibrant modules and Gorenstein projective modules is discussed, and we show that under some conditions such that GcdRG<∞, Ho(Fib) is equivalent to the stable category of Gorenstein projective RG-modules, the singularity category, and the homotopy category of totally acyclic complexes of projective RG-modules.