Homological theory of k-idempotent ideals in dualizing varieties

Abstract

In this work, we develop the theory of k-idempotent ideals in the setting of dualizing varieties. Several results given previously in APG by M. Auslander, M. I. Platzeck, and G. Todorov are extended to this context. Given an ideal I (which is the trace of a projective module), we construct a canonical recollement which is the analog to a well-known recollement in categories of modules over artin algebras. Moreover, we study the homological properties of the categories involved in such a recollement. Consequently, we find conditions on the ideal I to obtain quasi-hereditary algebras in such a recollement. Applications to bounded derived categories are also given.