(F,A)-Gorenstein flat homological dimensions

Abstract

In this paper we develop the homological properties of the (L, A)-Gorenstein flat R-modules GF(F(R), A) proposed by Gillespie. Where the class A ⊂eq Mod (Rop) sometimes corresponds to a duality pair (L, A). We study the weak global and finitistic dimensions that comes with GF(F(R), A) and show that over a (L, A)-Gorenstein ring, the functor - R - is left balanced over Mod (Rop) × Mod (R) by the classes GF(F(Rop), A) × GF(F(R), A). When the duality pair is (F (R), FPInj (Rop)) we recover the G. Yang's result over a Ding-Chen ring, and we see that is new for (Lev (R), AC (Rop)) among others.