Elliptic R-matrices and Feigin and Odesskii's elliptic algebras

Abstract

The algebras Qn,k(E,τ) introduced by Feigin and Odesskii as generalizations of the 4-dimensional Sklyanin algebras form a family of quadratic algebras parametrized by coprime integers n>k 1, a complex elliptic curve E, and a point τ∈ E. The main result in this paper is that Qn,k(E,τ) has the same Hilbert series as the polynomial ring on n variables when τ is not a torsion point. We also show that Qn,k(E,τ) is a Koszul algebra, hence of global dimension n when τ is not a torsion point, and, for all but countably many τ, it is Artin-Schelter regular. The proofs use the fact that the space of quadratic relations defining Qn,k(E,τ) is the image of an operator Rτ(τ) that belongs to a family of operators Rτ(z):Cnnnn, z∈C, that (we will show) satisfy the quantum Yang-Baxter equation with spectral parameter.