Add to ORKGWe describe how the use of a different degeneration from that considered by Eisenbud and Harris leads to a simple and characteristic-independent proof of the Brill-Noether theorem using limit linear series. As suggested by the degeneration, we prove an extended version of the theorem allowing for imposed ramification at up to two points. Although experts in the field have long been aware of the main ideas, we address some technical issues which arise in proving the full version of theorem
We study two dimension estimates regarding linear series on algebraic curves. First, we generalize t...
Eisenbud and Harris introduced the theory of limit linear series, and constructed a space p...
AbstractWe produce Brill–Noether general graphs in every genus, confirming a conjecture of Baker and...
We describe how the use of a different degeneration from that considered by Eisenbud and Ha...
We show that limit linear series spaces for chains of curves are reduced. Using new advances in the ...
Abstract. We produce Brill-Noether general graphs in every genus, confirm-ing a conjecture of Baker ...
We produce Brill-Noether general graphs in every genus, confirming a conjecture of Baker and giving ...
We first prove a generalized Brill-Noether theorem for linear series with prescribed multiv...
Abstract. In order to prove new existence results in Brill-Noether theory for rank-2 vector bundles ...
In 1874 Brill and Noether designed a seminal geometric method for computing bases of Riemann-Roch sp...
In order to prove new existence results in Brill-Noether theory for rank-2 vector bundles w...
We study (a generalization of) the notion of linked determinantal loci recently introduced ...
We compute the Euler characteristic of the structure sheaf of the Brill–Noether locus of linear seri...
We study two dimension estimates regarding linear series on algebraic curves. First, we generalize t...
Eisenbud and Harris introduced the theory of limit linear series, and constructed a space p...
AbstractWe produce Brill–Noether general graphs in every genus, confirming a conjecture of Baker and...
We describe how the use of a different degeneration from that considered by Eisenbud and Ha...
We show that limit linear series spaces for chains of curves are reduced. Using new advances in the ...
Abstract. We produce Brill-Noether general graphs in every genus, confirm-ing a conjecture of Baker ...
We produce Brill-Noether general graphs in every genus, confirming a conjecture of Baker and giving ...
We first prove a generalized Brill-Noether theorem for linear series with prescribed multiv...
Abstract. In order to prove new existence results in Brill-Noether theory for rank-2 vector bundles ...
In 1874 Brill and Noether designed a seminal geometric method for computing bases of Riemann-Roch sp...
In order to prove new existence results in Brill-Noether theory for rank-2 vector bundles w...
We study (a generalization of) the notion of linked determinantal loci recently introduced ...
We compute the Euler characteristic of the structure sheaf of the Brill–Noether locus of linear seri...
We study two dimension estimates regarding linear series on algebraic curves. First, we generalize t...
Eisenbud and Harris introduced the theory of limit linear series, and constructed a space p...
AbstractWe produce Brill–Noether general graphs in every genus, confirming a conjecture of Baker and...