Retractions and Gorenstein homological properties

Abstract

We associate to a localizable module a left retraction of algebras; it is a homological ring epimorphism that preserves singularity categories. We study the behavior of left retractions with respect to Gorenstein homological properties (for example, being Gorenstein algebras or CM-free). We apply the results to Nakayama algebras. It turns out that for a connected Nakayama algebra A, there exists a connected self-injective Nakayama algebra A' such that there is a sequence of left retractions linking A to A'; in particular, the singularity category of A is triangle equivalent to the stable category of A'. We classify connected Nakayama algebras with at most three simple modules according to Gorenstein homological properties.