Banach modules, almost mathematics and condensed mathematics

Abstract

We study the relationship between almost mathematics, condensed mathematics and the categories of seminormed and Banach modules over a Banach ring A, with submetric (norm-decreasing) A-module homomorphisms for morphisms. If A is a Banach ring with a norm-multiplicative topologically nilpotent unit contained in the closed unit ball A≤1 such that admits a compatible system of p-power roots 1/pn with equation*1/pn=1/pnequation*for all n, we prove that the "almost closed unit ball" functor equation*M M≤1aequation*is an equivalence between the category of Banach A-modules and submetric A-module maps and the category of -adically complete, -torsion-free almost (A≤1, (1/p∞))-modules. We also obtain an analogous result for Banach algebras and almost algebras. The main novelty in our approach is that we show that the norm on the Banach module M is completely determined by the corresponding almost A≤1-module M≤1a, rather than being determined only up to equivalence. We deduce from our results the existence of a natural fully faithful embedding of the category of Banach A-modules and submetric A-module maps into the category of (static) condensed almost (A≤1, (1/p∞))-modules in the sense of Mann, which factors through the full subcategory of solid condensed (A≤1, (1/p∞))-almost modules. If A is perfectoid and the adic spectrum of (A, A) is totally disconnected, we show that this embedding transforms the complete tensor product of Banach A-modules into (an almost analog of) the solid tensor product of solid condensed almost modules.