Simple modules over the 4-dimensional Sklyanin Algebras at points of finite order

Abstract

In 1982 E.K. Sklyanin defined a family of graded algebras A(E,τ), depending on an elliptic curve E and a point τ ∈ E that is not 4-torsion. The present paper is concerned with the structure of A when τ is a point of finite order, n say. It is proved that every simple A-module has dimension n and that "almost all" have dimension precisely n. There are enough finite dimensional simple modules to separate elements of A; that is, if 0 a ∈ A, then there exists a simple module S such that a.S 0. Consequently A satisfies a polynomial identity of degree 2n (and none of lower degree). Combined with results of Levasseur and Stafford it follows that A is a finite module over its center. Therefore one may associate to A a coherent sheaf, A say, of finite OS algebras where S is the projective 3-fold determined by the center of A. We determine where A is Azumaya, and prove that the division algebra Fract( A) has rational center. Thus, for each E and each τ ∈ E of order n 0,2,4 one obtains a division algebra of degree s over the rational function field of P3, where s=n if n is odd, and s=1 2 n if n is even. The main technical tool in the paper is the notion of a "fat point" introduced by M. Artin. A key preliminary result is the classification of the fat points: these are parametrized by a rational 3-fold.