Linear sections of the Severi variety and moduli of curves

Abstract

We study the Severi variety Vd,g of plane curves of degree d and geometric genus g. Corresponding to every such variety, there is a one-parameter family of genus g stable curves whose numerical invariants we compute. Building on the work of Caporaso and Harris, we derive a recursive formula for the degrees of the Hodge bundle on the families in question. For d large enough, these families induce moving curves in Mg. We use this to derive lower bounds for the slopes of effective divisors on Mg. Another application of our results is to various enumerative problems on Vd,g.