Marked nodal curves with vector fields

Abstract

We discuss two operations on nodal curves with (logarithmic) vector fields, which resemble the `stabilization' construction in Knudsen's proof that Mg,n+1 is the universal curve over Mg,n. We prove that both operations work in families (commute with base change). We construct inverse operations under suitable assumptions, which allow us to prove a technical result quite similar to Knudsen's, in the case of curves with vector fields. As an application, we prove that the Losev--Manin compactification of the space of configurations of n points on P1 \0,∞\ modulo scaling degenerates isotrivially to a compactification of the space of configurations of n points on A1 modulo translation, and the natural group actions fit together globally.