A Riemann--Kempf singularity theorem for higher rank Brill--Noether loci

Abstract

Given a vector bundle V over a curve X, we define and study a surjective rational map Hilbd (P V ) - Quot0, d ( V* ) generalising the natural map Symd X Quot0, d ( OX). We then give a generalisation of the geometric Riemann--Roch theorem to vector bundles of higher rank over X. We use this to give a geometric description of the tangent cone to the Brill--Noether locus Brr, d at a suitable bundle E with h0 (E) = r+n. This gives a generalisation of the Riemann--Kempf singularity theorem. As a corollary, we show that the nth secant variety of the rank one locus of P End E is contained in the tangent cone.