English

Adelic Descent Theory

Algebraic Geometry 2019-02-20 v2 Number Theory

Abstract

A result of Andr\'e Weil allows one to describe rank nn vector bundles on a smooth complete algebraic curve up to isomorphism via a double quotient of the set GLn(A)\mathrm{GL}_n(\mathbb{A}) of regular matrices over the ring of ad\`eles (over algebraically closed fields, this result is also known to extend to GG-torsors for a reductive algebraic group GG). In the present paper we develop analogous adelic descriptions for vector and principal bundles on arbitrary Noetherian schemes, by proving an adelic descent theorem for perfect complexes. We show that for Beilinson's co-simplicial ring of ad\`eles AX\mathbb{A}_X^{\bullet}, we have an equivalence Perf(X)Perf(AX)\mathsf{Perf}(X) \simeq |\mathsf{Perf}(\mathbb{A}_X^{\bullet})| between perfect complexes on XX and cartesian perfect complexes for AX\mathbb{A}_X^{\bullet}. Using the Tannakian formalism for symmetric monoidal \infty-categories, we conclude that a Noetherian scheme can be reconstructed from the co-simplicial ring of ad\`eles. We view this statement as a scheme-theoretic analogue of Gelfand--Naimark's reconstruction theorem for locally compact topological spaces from their ring of continuous functions. Several results for categories of perfect complexes over (a strong form of) flasque sheaves of algebras are established, which might be of independent interest.

Keywords

Cite

@article{arxiv.1511.06271,
  title  = {Adelic Descent Theory},
  author = {Michael Groechenig},
  journal= {arXiv preprint arXiv:1511.06271},
  year   = {2019}
}

Comments

28 pages, Thm. 0.4 corrected, minor corrections

R2 v1 2026-06-22T11:49:36.980Z