Duality Pairs Induced by One-Sided Gorenstein Subcategories

Abstract

For a ring R and an additive subcategory of the category R of left R-modules, under some conditions we prove that the right Gorenstein subcategory of R and the left Gorenstein subcategory of Rop relative to form a coproduct-closed duality pair. Let R,S be rings and C a semidualizing (R,S)-bimodule. As applications of the above result, we get that if S is right coherent and C is faithfully semidualizing, then (GFC(R),GIC(Rop)) is a coproduct-closed duality pair and GFC(R) is covering in R, where GFC(R) is the subcategory of R consisting of C-Gorenstein flat modules and GIC(Rop) is the subcategory of Rop consisting of C-Gorenstein injective modules; we also get that if S is right coherent, then (AC(Rop),lG(FC(R))) is a coproduct-closed and product-closed duality pair and AC(Rop) is covering and preenveloping in Rop, where AC(Rop) is the Auslander class in Rop and lG(FC(R)) is the left Gorenstein subcategory of R relative to C-flat modules.