On linear series with negative Brill-Noether number

Abstract

Brill-Noether theory studies the existence and deformations of curves in projective spaces; its basic object of study is Wrd,g, the moduli space of smooth genus g curves with a choice of degree d line bundle having at least (r+1) independent global sections. The Brill-Noether theorem asserts that the map Wrd,g → Mg is surjective with general fiber dimension given by the number = g - (r+1)(g-d+r), under the hypothesis that 0 ≤ ≤ g. One may naturally conjecture that for < 0, this map is generically finite onto a subvariety of codimension - in Mg. This conjecture fails in general, but seemingly only when - is large compared to g. This paper proves that this conjecture does hold for at least one irreducible component of Wrd,g, under the hypothesis that 0 < - ≤ rr+2 g - 3r+3. We conjecture that this result should hold for all 0 < - ≤ g + C for some constant C, and we give a purely combinatorial conjecture that would imply this stronger result.