Tilting theory for finite dimensional 1-Iwanaga-Gorenstein algebras

Abstract

In representation theory of graded Iwanaga-Gorenstein algebras, tilting theory of the stable category CMZ A of graded Cohen-Macaulay modules plays a prominent role. In this paper we study the following two central problems of tilting theory of CMZ A in the case where A is finite dimensional: (1) Does CMZ A have a tilting object? (2) Does the endomorphism algebras of tilting objects in CMZ A have finite global dimension? To the problem (2) we give the complete answer. We show that the endomorphism algebra of any tilting object in CMZA has finite global dimension. To the problem (1) we give a partial answer. For this purpose, first we introduce an invariant g(A) for a finite dimensional graded algebra A. Then, we prove that in the case where A is 1-Iwanaga-Gorenstein, an inequality for g(A) gives a sufficient condition that a specific Cohen-Macaulay module V becomes a tilting object in the stable category. As an application, we study the existence of tilting objects in CMZ(Q)w where (Q)w is the truncated preprojective algebra of a quiver Q associated to w∈ WQ. We prove that if the underling graph of Q is tree, then CMZ(Q)w has a tilting object.