Isotropic Quot schemes of orthogonal bundles over a curve

Abstract

We study the isotropic Quot schemes IQe (V) parameterizing degree e isotropic subsheaves of maximal rank of an orthogonal bundle V over a curve. The scheme IQe (V) contains a compactification of the space IQoe (V) of degree e maximal isotropic subbundles, but behaves quite differently from the classical Quot scheme, and the Lagrangian Quot scheme in [6]. We observe that for certain topological types of V, the scheme IQe (V) is empty for all e. In the remaining cases, for infinitely many e there are irreducible components of IQe (V) consisting entirely of nonsaturated subsheaves, and so IQe (V) is strictly larger than the closure of IQoe (V). As our main result, we prove that for any orthogonal bundle V and for e 0, the closure IQoe (V) of IQoe (V) is either empty or consists of one or two irreducible connected components, depending on (V) and e. In so doing, we also characterize the nonsaturated part of IQoe (V) when V has even rank.