Dimension counts for singular rational curves via semigroups

Abstract

We study singular rational curves in projective space, deducing conditions on their parametrizations from the value semigroups of their singularities. In particular, we prove that a natural heuristic for the codimension of the space of nondegenerate rational curves of arithmetic genus g>0 and degree d in Pn, viewed as a subspace of all degree-d rational curves in Pn, holds whenever g is small. On the other hand, we show that this heuristic fails in general, by exhibiting an infinite family of examples of Severi-type varieties of rational curves containing "excess" components of dimension strictly larger than the space of g-nodal rational curves.