Fractionally Calabi-Yau algebras and cluster tilting

TL;DR

This paper establishes a new connection between twisted fractionally Calabi-Yau algebras and higher Auslander algebras, providing novel characterizations and constructions within representation theory.

Contribution

It proves that twisted fractionally Calabi-Yau algebras of finite global dimension correspond to stable endomorphism algebras of d-cluster tilting modules over d-representation-finite algebras, linking two areas.

Findings

Characterization of twisted n/2-Calabi-Yau algebras

Triangle equivalence with graded stable module categories

Construction of new classes of higher Auslander algebras

Abstract

We show that the class of twisted fractionally Calabi-Yau algebras of finite global dimension coincides with the stable endomorphism algebras of $d$-cluster tilting modules over $d$-representation-finite algebras. This is an application of our main result stating that an algebra $A$ of finite global dimension is twisted fractionally Calabi-Yau if and only if there exists $i$ such that the replicated algebra $A^{(i)}$ is a higher Auslander algebra if and only if there exist infinitely many $i$ such that $A^{(i)}$ is a higher Auslander algebra. This gives a new connection between the study of higher Auslander-Reiten theory and twisted fractionally Calabi-Yau algebras, and provides a new construction of large classes of higher Auslander algebras and higher representation-finite algebras. We give several applications such as an explicit characterisation of twisted $\frac{n}{2}$-Calabi-Yau algebras, and a triangle equivalence between the bounded derived category of a twisted fractionally Calabi-Yau algebra of finite global dimension and the $\mathbb{Z}$-graded stable module category of an associated higher preprojective algebra.