On n-translation algebras

Abstract

Motivated by Iyama's higher representation theory, we introduce n-translation quivers and n-translation algebras. The classical Z Q construction of the translation quiver is generalized to construct an (n+1)-translation quiver from an n-translation quiver, using trivial extension and smash product. We prove that the quadratic dual of n-translation algebras have (n-1)-almost splitting sequences in the category of its projective modules. We also present a non-Koszul 1-translation algebra whose trivial extension is 2-translation algebra, thus also provides a class of examples of (3,m-1)-Koszul algebras (and also a class of (m-1,3)-Koszul algebras) for all m 2.