Derived equivalences for $Φ$-Auslander-Yoneda algebras

Wei Hu, Changchang Xi

Published 2009-12-03, updated 2010-02-23Version 2

In this paper, we introduce $\Phi$-Auslander-Yoneda algebras in a triangulated category with $\Phi$ a parameter set in $\mathbb N$, and provide a method to construct new derived equivalences between these $\Phi$-Auslander-Yoneda algebras (not necessarily Artin algebras), or their quotient algebras, from a given almost $\nu$-stable derived equivalence. As consequences of our method, we have: (1) Suppose that $A$ and $B$ are representation-finite, self-injective Artin algebras with $_AX$ and $_BY$ additive generators for $A$ and $B$, respectively. If $A$ and $B$ are derived-equivalent, then the $\Phi$-Auslander-Yoneda algebras of $X$ and $Y$ are derived-equivalent for every admissible set $\Phi$. In particular, the Auslander algebras of $A$ and $B$ are both derived-equivalent and stably equivalent. (2) For a self-injective Artin algeba $A$ and an $A$-module $X$, the $\Phi$-Auslander-Yoneda algebras of $A\oplus X$ and $A\oplus \Omega_A(X)$ are derived-equivalent for every admissible set $\Phi$, where $\Omega$ is the Heller loop operator. Motivated by these derived equivalences between $\Phi$-Auslander-Yoneda algebras, we consider constructions of derived equivalences for quotient algebras, and show, among others, that a derived equivalence between two basic self-injective algebras may transfer to a derived equivalence between their quotient algebras obtained by factorizing out socles.