τ-rigid modules for algebras with radical square zero

Abstract

In this paper, we show that for an algebra with radical square zero and an indecomposable -module M such that is Gorenstein of finite type or τ M is τ-rigid, M is τ-rigid if and only if the first two projective terms of a minimal projective resolution of M have no on-zero direct summands in common. We also determined all τ-tilting modules for Nakayama algebras with radical square zero. Moreover, by giving a construction theorem we show that a basic connected radical square zero algebra admitting a unique τ-tilting module is local.