Tropical double ramification loci

Abstract

Motivated by the realizability problem for principal tropical divisors with a fixed ramification profile, we explore the tropical geometry of the double ramification locus in Mg,n.There are two ways to define a tropical analogue of the double ramification locus: one as a locus of principal divisors, the other as a locus of finite effective ramified covers of a tree. We show that both loci admit a structure of a generalized cone complex in Mg,ntrop, with the latter contained in the former. We prove that the locus of principal divisors has cones of codimension zero in Mg,ntrop, while the locus of ramified covers has the expected codimension g. This solves the deformation-theoretic part of the realizability problem for principal divisors, reducing it to the so-called Hurwitz existence problem for covers of a fixed ramification type.