Martens and Mumford theorems for higher rank Brill--Noether loci

TL;DR

This paper extends classical theorems to higher rank vector bundles over curves, providing bounds on Brill--Noether loci dimensions and analyzing their geometric properties, including irreducibility and reducedness.

Contribution

It generalizes Martens and Mumford theorems to higher rank bundles, proving a conjecture and refining bounds for specific degrees, with geometric analysis of tangent spaces.

Findings

Upper bounds on dimensions of Brill--Noether loci for stable bundles

Proof of irreducibility and reducedness of certain loci for n ≥ 5

Generalized Mumford theorem for degrees d ≤ g - 1

Abstract

Generalizing the Martens theorem for line bundles over a curve $C$, we obtain upper bounds on the dimension of the Brill--Noether locus $B^k_{n, d}$ parametrizing stable bundles of rank $n \ge 2$ and degree $d$ over $C$ with at least $k$ independent sections. This proves a conjecture of the second author and generalizes bounds obtained by him in the rank two case. We give more refined results for some values of $d$, including a generalized Mumford theorem for $n \ge 2$ when $d \le g - 1$. The statements are obtained chiefly by analysis of the tangent spaces of $B^k_{n, d}$. As an application, we show that for $n \ge 5$ the locus $B^2_{n, n(g-1)}$ is irreducible and reduced for any $C$.