Linear Tropicalizations

Abstract

Let X be a closed algebraic subset of An(K) where K is an algebraically closed field complete with respect to a nontrivial non-Archimedean valuation. We show that there is a surjective continuous map from the Berkovich space of X to an inverse limit of a certain family of embeddings of X called linear tropicalizations of X. This map is injective on the subset of the Berkovich space Xan which contains all seminorms arising from closed points of X. We show that the map is a homeomorphism if X is a non-singular algebraic curve. Some applications of these results to transversal intersections are given. In particular we prove that there exists a tropical line arrangement which is realizable by a complex line arrangement but not realizable by any real line arrangement.