Tilting modules over Auslander-Gorenstein Algebras

Abstract

For a finite dimensional algebra and a non-negative integer n, we characterize when the set n of additive equivalence classes of tilting modules with projective dimension at most n has a minimal (or equivalently, minimum) element. This generalize results of Happel-Unger. Moreover, for an n-Gorenstein algebra with n≥ 1, we construct a minimal element in n. As a result, we give equivalent conditions for a k-Gorenstein algebra to be Iwanaga-Gorenstein. Moreover, for an 1-Gorenstein algebra and its factor algebra =/(e), we show that there is a bijection between 1 and the set of isomorphism classes of basic support τ-tilting -modules, where e is an idempotent such that e is the additive generator of projective-injective -modules.