Segre invariants of principal bundles over a curve

Abstract

For a vector bundle V over a curve X, the Segre invariant sn (V) encodes the maximal degree attained by rank n subbundles of V. The functions sn define stratifications on moduli of V which are well studied. Let G be a connected reductive algebraic group, and E X a principal G-bundle. For each parabolic subgroup P ⊂ G there is a Segre number sP (E), generalising sn (V). We show that sP is semicontinuous in families of G-bundles, and thus defines stratifications on moduli spaces of G-bundles over X. We study the invariance properties of sP, relating the behaviour of sP and sφ(P) for a surjective homomorphism φ G H and allowing us to compare the Segre stratifications for G and H. Finally, we analyse the stratification for the Borel subgroup B of GL3, identifying patterns in the geometry and proving, in particular, a sharp Hirschowitz-type bound on sB (E) for certain topological types.