Homological behavior of idempotent subalgebras and Ext algebras

Abstract

Let A be a (left and right) Noetherian ring that is semiperfect. Let e be an idempotent of A and consider the ring :=(1-e)A(1-e) and the semi-simple right A-module Se : = eA/e radA. In this paper, we investigate the relationship between the global dimensions of A and , by using the homological properties of Se. More precisely, we consider the Yoneda ring Y(e):= Ext*A(Se,Se) of e. We prove that if Y(e) is artinian of finite global dimension, then A has finite global dimension if and only if so is . We also investigate the situation where both A, have finite global dimension. When A is Koszul and finite dimensional, this implies that Y(e) has finite global dimension. We end the paper with a reduction technique to compute the Cartan determiant of artin algebras. We prove that if Y(e) has finite global dimension, then the Cartan determinants of A and coincide. This provides a new way to approach the long-standing Cartan determinant conjecture.