The Fine Moduli Space of Representations of Clifford Algebras

Abstract

Given a fixed binary form f(u,v) of degree d over a field k, the associated Clifford algebra is the k-algebra Cf=k\u,v\/I, where I is the two-sided ideal generated by elements of the form (α u+β v)d-f(α,β) with α and β arbitrary elements in k. All representations of Cf have dimensions that are multiples of d, and occur in families. In this article we construct fine moduli spaces U=Uf,r for the irreducible rd-dimensional representations of Cf for each r ≥ 2. Our construction starts with the projective curve C ⊂ P2k defined by the equation wd=f(u,v), and produces Uf,r as a quasiprojective variety in the moduli space M(r,dr) of stable vector bundles over C with rank r and degree dr=r(d+g-1), where g denotes the genus of C.