τ-slice algebras of n-translation algebras and quasi n-Fano algebras

Abstract

In this paper, we show that the n-APR tilts of dual τ-slice algebras of acyclic stable n-translation algebras are realized as τ-mutations. Such dual τ-slice algebras are quasi (n-1)-Fano when the n-translation algebra is Koszul, and a recursive construction of higher quasi Fano algebras for quasi n-Fano algebra obtained in this way is given. The τn-closure and n-closure of such algebras are studied and we show that for an acyclic dual n-translation algebras with bound quiver Q, the Auslander-Reiten quivers of its τn-closures are truncation of the quiver Z|n Q, and the Auslander-Reiten quiver of its n-closure is Z|n Q when it is n-representation infinite.