Self-orthogonal tau-tilting modules and tilting modules

Abstract

Let be an artin algebra and T a τ-tilting -module. We prove that T is a tilting module if and only if Exti(T, T)=0 for all i≥ 1, where T is the full subcategory consisting of modules generated by T. Consequently, a τ-tilting module T of finite projective dimension is a tilting module if and only if Exti(T, T)=0 for all i≥ 1. Moreover, we also give an example to show that a support τ-tilting but not τ-tilting module M of finite projective dimension satisfying Exti(M, M)=0 for all i≥1 need not be a partial tilting module.