Litcius/Paper detail

Real Tropicalization and Analytification of Semialgebraic Sets

Philipp Jell, Claus Scheiderer, Josephine Yu

2020International Mathematics Research Notices27 citationsDOI

Abstract

Abstract Let $K$ be a real closed field with a nontrivial non-archimedean absolute value. We study a refined version of the tropicalization map, which we call real tropicalization map, that takes into account the signs on $K$. We study images of semialgebraic subsets of $K^n$ under this map from a general point of view. For a semialgebraic set $S \subseteq K^n$ we define a space $S_r^{{\operatorname{an}}}$ called the real analytification, which we show to be homeomorphic to the inverse limit of all real tropicalizations of $S$. We prove a real analogue of the tropical fundamental theorem and show that the tropicalization of any semialgebraic set is described by tropicalization of finitely many inequalities, which are valid on the semialgebraic set. We also study the topological properties of real analytification and tropicalization. If $X$ is an algebraic variety, we show that $X_r^{{\operatorname{an}}}$ can be canonically embedded into the real spectrum $X_r$ of $X$, and we study its relation with the Berkovich analytification of $X$.

Topics & Concepts

MathematicsSpace (punctuation)Algebraic varietyAlgebraic numberPure mathematicsField (mathematics)Variety (cybernetics)Set (abstract data type)Inverse limitReal numberDiscrete mathematicsMathematical analysisComputer scienceStatisticsOperating systemProgramming languagePolynomial and algebraic computationAdvanced Differential Equations and Dynamical SystemsAlgebraic Geometry and Number Theory