Dimension theory and degenerations of de Jonqui\`eres divisors

Abstract

This paper aims at settling the issue of the validity of the de Jonqui\`eres formulas. We consider the space of divisors with prescribed multiplicity, or de Jonqui\`eres divisors, contained in a linear series on a smooth projective curve. Assuming zero expected dimension of this space, the de Jonqui\`eres formulas compute the virtual number of de Jonqui\`eres divisors. Using degenerations to nodal curves we show that for a general curve equipped with a general complete linear series, the space is of expected dimension, which shows that the counts are in fact true. This implies that in the case of negative expected dimension a general linear series on a general curve does not admit de Jonqui\`eres divisors of the expected type.