On Artin algebras arising from Morita contexts

Abstract

We study Morita rings (φ,)=(smallmatrix A &ANBBMA & B smallmatrix) in the context of Artin algebras from various perspectives. First we study covariant finite, contravariant finite, and functorially finite subcategories of the module category of a Morita ring when the bimodule homomorphisms φ and are zero. Further we give bounds for the global dimension of a Morita ring (0,0), regarded as an Artin algebra, in terms of the global dimensions of A and B in the case when both φ and are zero. We illustrate our bounds with some examples. Finally we investigate when a Morita ring is a Gorenstein Artin algebra and then we determine all the Gorenstein-projective modules over the Morita ring with A=N=M=B=, where is an Artin algebra.