A generalized Koszul theory and its relation to the classical theory

Abstract

Let A = i ≥slant 0 Ai be a graded locally finite k-algebra such that A0 is an arbitrary finite-dimensional algebra satisfying a certain splitting condition. In this paper we develop a generalized Koszul theory preserving many classical results. Moreover, we define a quotient graded algebra A = i ≥slant 0 Ai and show that A is a generalized Koszul algebra if and only if A is a classical Koszul algebra and a projective A0-module. We also describe an application of this theory to the extension algebras of standard modules of standardly stratified algebras.