Maps from Feigin and Odesskii's elliptic algebras to twisted homogeneous coordinate rings

Abstract

The elliptic algebras in the title are connected graded C-algebras, denoted Qn,k(E,τ), depending on a pair of relatively prime integers n>k 1, an elliptic curve E, and a point τ∈ E. This paper examines a canonical homomorphism from Qn,k(E,τ) to the twisted homogeneous coordinate ring B(Xn/k,σ',L'n/k) on the characteristic variety Xn/k for Qn,k(E,τ). When Xn/k is isomorphic to Eg or the symmetric power SgE we show the homomorphism Qn,k(E,τ) B(Xn/k,σ',L'n/k) is surjective, that the relations for B(Xn/k,σ',L'n/k) are generated in degrees 3, and the non-commutative scheme Projnc(Qn,k(E,τ)) has a closed subvariety that is isomorphic to Eg or SgE, respectively. When Xn/k=Eg and τ=0, the results about B(Xn/k,σ',L'n/k) show that the morphism |Ln/k|:Eg Pn-1 embeds Eg as a projectively normal subvariety that is a scheme-theoretic intersection of quadric and cubic hypersurfaces.