Gorenstein and duality pair over triangular matrix rings

Abstract

Let A, B be two rings and T=(smallmatrix A & M \\ 0 & B \\smallmatrix) with M an A-B-bimodule. We first construct a semi-complete duality pair DT of T-modules using duality pairs in A-Mod and B-Mod respectively. Then we characterize when a left T-module is Gorenstein DT-projective, Gorenstein DT-injective or Gorenstein DT-flat. These three class of T-modules will induce model structures on T-Mod. Finally we show that the homotopy category of each of model structures above admits a recollement relative to corresponding stable categories. Our results give new characterizations to earlier results in this direction.