Relative contravariantly finite subcategories and relative tilting modules

Abstract

Let A be a finite dimensional algebra over an algebraically closed field k. Let T be a tilting A-module and B= EndA\ T be the endomorphism algebra of T. In this paper, we consider the correspondence between the tilting A-modules and the tilting B-modules, and we prove that there is a one-one correspondence between the basic T-tilting A-modules in T and the basic tilting B-modules in (DBT). Moreover, we show that there is a one-one correspondence between the T-contravariantly finite T-resolving subcategories of T and the basic T-tilting A-modules contained in T. As an application, we show that there is a one-one correspondence between the basic tilting A-modules in T and the basic tilting B-modules in (DBT) if A is a 1-Gorenstein algebra or a m-replicated algebra over a finite dimensional hereditary algebra.