Multiplicity algebras for rank 2 bundles on curves of small genus

Abstract

In [11], Hausel introduced a commutative algebra — the multiplicity algebra — associated to a fixed point of the [Formula: see text]-action on the Higgs bundle moduli space. Here we describe this algebra for a fixed point consisting of a very stable rank 2 vector bundle and zero Higgs field for a curve of low genus. Geometrically, the relations in the algebra are described by a family of quadrics and we focus on the discriminant of this family, providing a new viewpoint on the moduli space of stable bundles. The discriminant in our examples demonstrates that as the bundle varies, we obtain a continuous variation in the isomorphism class of the algebra.