Linear series with < 0 via thrifty lego-building

Abstract

The moduli space Grg,d Mg parameterizing algebraic curves with a linear series of degree d and rank r has expected relative dimension = g - (r+1)(g-d+r). Classical Brill-Noether theory concerns the case ≥ 0; we consider the non-surjective case < 0. We prove the existence of components of this moduli space with the expected relative dimension when 0 > ≥ -g+3, or 0 > ≥ -Cr g + O(g5/6), where Cr is a constant depending on the rank of the linear series such that Cr 3 as r ∞. These results are proved via a two-marked-point generalization suitable for inductive arguments, and the regeneration theorem for limit linear series.