Skeletons and tropicalizations
Abstract
Let be a complete, algebraically closed non-archimedean field with ring of integers and let be a -variety. We associate to the data of a strictly semistable -model of plus a suitable horizontal divisor a skeleton in the analytification of . This generalizes Berkovich's original construction by admitting unbounded faces in the directions of the components of H. It also generalizes constructions by Tyomkin and Baker--Payne--Rabinoff from curves to higher dimensions. Every such skeleton has an integral polyhedral structure. We show that the valuation of a non-zero rational function is piecewise linear on . For such functions we define slopes along codimension one faces and prove a slope formula expressing a balancing condition on the skeleton. Moreover, we obtain a multiplicity formula for skeletons and tropicalizations in the spirit of a well-known result by Sturmfels--Tevelev. We show a faithful tropicalization result saying roughly that every skeleton can be seen in a suitable tropicalization. We also prove a general result about existence and uniqueness of a continuous section to the tropicalization map on the locus of tropical multiplicity one.
Cite
@article{arxiv.1404.7044,
title = {Skeletons and tropicalizations},
author = {Walter Gubler and Joseph Rabinoff and Annette Werner},
journal= {arXiv preprint arXiv:1404.7044},
year = {2016}
}
Comments
44 pages, 2 figures. Version 3: minor errors corrected; Remark 3.14 expanded. Final version, to appear in Advances in Mathematics