Tilting theory for hypersurface singularities of dimension one

Abstract

Any N-graded commutative Gorenstein ring R of Krull dimension one with R0 a field admits a standard silting object V in the stable category CM0ZR, and the object V is tilting if and only if the a-invariant a is non-negative, as shown by Buchweitz, the first author, and Yamaura. In this article, under the additional assumption that R is a hypersurface singularity, we prove that endomorphism algebra of V is Iwanaga-Gorenstein of self-injective dimension at most 2, and we give its explicit presentation in terms of a quiver with relation. In the case of where a is negative, we prove that the dg endomorphism algebra of V is Gorenstein, and we give its explicit presentation in terms of a dg path algebra. We explain our results by several examples including numerical semigroup algebras generated by two elements. Moreover, for each finite and countable Cohen-Macaulay representation type, we include the Auslander-Reiten quiver of the category CM0ZR with the position of the standard silting object. As a step of the proof of our results, we give a characterization of Gorensteinness of homologically finite dg algebras in terms of Serre functors.