English

Analytification, localization and homotopy epimorphisms

Algebraic Geometry 2022-03-21 v2 Functional Analysis Number Theory Rings and Algebras

Abstract

We study the interaction between various analytification functors, and a class of morphisms of rings, called homotopy epimorphisms. An analytification functor assigns to a simplicial commutative algebra over a ring RR, along with a choice of Banach structure on RR, a commutative monoid in the monoidal model category of simplicial ind-Banach RR-modules. We show that several analytifications relevant to analytic geometry - such as Tate, overconvergent, Stein analytification, and formal completion - are homotopy epimorphisms. Another class of examples arises from Weierstrass, Laurent and rational localisations in derived analytic geometry. As applications of this result, we prove that Hochschild homology and the cotangent complex are computable for analytic rings, and the computation relies only on known computations of Hochschild homology for polynomial rings. We show that in various senses, Hochschild homology as we define it commutes with localizations, analytifications and completions.

Keywords

Cite

@article{arxiv.2111.04184,
  title  = {Analytification, localization and homotopy epimorphisms},
  author = {Oren Ben-Bassat and Devarshi Mukherjee},
  journal= {arXiv preprint arXiv:2111.04184},
  year   = {2022}
}
R2 v1 2026-06-24T07:29:41.763Z