Tilting theory for Gorenstein rings in dimension one

Abstract

For a Z-graded Gorenstein ring R, we study the stable category CMZR of Z-graded maximal Cohen-Macaulay R-modules, which is canonically triangle equivalent to the singularity category of Buchweitz and Orlov. Its thick subcategory given as the stable category of CM0ZR is central in representation theory since it enjoys Auslander-Reiten-Serre duality and has almost split triangles. In the case dim R=1, we prove that the stable category of CM0ZR always admits a silting object, and that it admits a tilting object if and only if either R is regular or the a-invariant of R is non-negative.