On Bands and Limit Theorems in Tropical Geometry

Abstract

We review the basic theory of bands and band schemes introduced by Baker-Jin-Lorscheid, which is an algebraic framework for tropicalization, analytification, and F1-geometry. For an affine scheme X over a non-Archimedean valued field k, one can associate to every affine embedding of X a naturally defined affine band scheme Y whose rational points over the tropical band T recover the tropicalization Trop(X,). We prove that X is the limit of the Y in the category of band schemes, thereby obtaining a scheme-theoretic enhancement of Payne's limit theorem. By taking T-rational points, this recovers Payne's theorem for affine tropicalizations from the perspective of band scheme theory and the same method provides an analogous result in the real tropical setting.