We implement new techniques involving Artin fans to study the realizability
of tropical stable maps in superabundant combinatorial types. Our approach is
to understand the skeleton of a fundamental object in logarithmic
Gromov--Witten theory -- the stack of prestable maps to the Artin fan. This is
used to examine the structure of the locus of realizable tropical curves and
derive 3 principal consequences. First, we prove a realizability theorem for
limits of families of tropical stable maps. Second, we extend the sufficiency
of Speyer's well-spacedness condition to the case of curves with good
reduction. Finally, we demonstrate the existence of liftable genus 1
superabundant tropical curves that violate the well-spacedness condition.Comment: 17 pages, 1 figure. v2 fixes a minor gap in the proof of Theorem D
and adds details to the construction of the skeleton of a toroidal Artin
stack. Minor clarifications throughout. To appear in Research in the
Mathematical Science
