A properness result for degenerate Quadratic and Symplectic Bundles on a smooth projective curve

Abstract

Let (V,q) be a vector bundle on a smooth projective curve X together with a quadratic form q: Sym2(V) OX (respectively symplectic form q: 2V OX). Fixing the degeneracy locus of the quadratic form induced on V/(q), we construct a coarse moduli of such objects. Further, we prove semi-stable reduction theorem for equivalence classes of such objects. In particular, the case when degeneracies of q are higher than one is that of principal interest. We also provide a proof of properness of polystable orthogonal bundles without appealing to Bruhat-Tits theory in any characteristic.