Derived Analytic Geometry for Z-Valued Functions. Part I -- Topological Properties

Abstract: We study the Banach algebras C(X, R) of continuous functions from a compact Hausdorff topological space X to a Banach ring R whose topology is discrete. We prove that the Berkovich spectrum of C(X, R) is homeomorphic to ζ(X) × M (R), where ζ(X) is the Banaschewski compactification of X and M (R) is the Berkovich spectrum of R. We study how the topology of the spectrum of C(X, R) is related to the notion of homotopy Zariski open embedding used in derived geometry. We find that the topology of ζ(X) can be easily… Show more