Tropical Skeletons
Abstract
In this paper, we study the interplay between tropical and analytic geometry for closed subschemes of toric varieties. Let be a complete non-Archimedean field, and let be a closed subscheme of a toric variety over . We define the tropical skeleton of as the subset of the associated Berkovich space which collects all Shilov boundary points in the fibers of the Kajiwara--Payne tropicalization map. We develop polyhedral criteria for limit points to belong to the tropical skeleton, and for the tropical skeleton to be closed. We apply the limit point criteria to the question of continuity of the canonical section of the tropicalization map on the multiplicity-one locus. This map is known to be continuous on all torus orbits; we prove criteria for continuity when crossing torus orbits. When is sch\"on and defined over a discretely valued field, we show that the tropical skeleton coincides with a skeleton of a strictly semistable pair, and is naturally isomorphic to the parameterizing complex of Helm--Katz.
Keywords
Cite
@article{arxiv.1508.01179,
title = {Tropical Skeletons},
author = {Walter Gubler and Joseph Rabinoff and Annette Werner},
journal= {arXiv preprint arXiv:1508.01179},
year = {2017}
}
Comments
42 pages. The introduction was rewritten. Corollary 8.15 was renamed to Theorem 8.15