The Extension Dimension of Abelian Categories

Abstract

Let be an abelian category having enough projective objects and enough injective objects. We prove that if admits an additive generating object, then the extension dimension and the weak resolution dimension of are identical, and they are at most the representation dimension of minus two. By using it, for a right Morita ring , we establish the relation between the extension dimension of the category of finitely generated right -modules and the representation dimension as well as the right global dimension of . In particular, we give an upper bound for the extension dimension of in terms of the projective dimension of certain class of simple right -modules and the radical layer length of . In addition, we investigate the behavior of the extension dimension under some ring extensions and recollements.