Fr\'echet Modules and Descent
Functional Analysis
2026-03-17 v6 Algebraic Geometry
Category Theory
Complex Variables
Number Theory
Abstract
We study several aspects of the study of Ind-Banach modules over Banach rings thereby synthesizing some aspects of homological algebra and functional analysis. This includes a study of nuclear modules and of modules which are flat with respect to the projective tensor product. We also study metrizable and Fr\'{e}chet Ind-Banach modules. We give explicit descriptions of projective limits of Banach rings as ind-objects. We study exactness properties of projective tensor product with respect to kernels and countable products. As applications, we describe a theory of quasi-coherent modules in Banach algebraic geometry. We prove descent theorems for quasi-coherent modules in various analytic and arithmetic contexts.
Keywords
Cite
@article{arxiv.2002.11608,
title = {Fr\'echet Modules and Descent},
author = {Oren Ben-Bassat and Kobi Kremnizer},
journal= {arXiv preprint arXiv:2002.11608},
year = {2026}
}
Comments
improved version