English

Knots, Primes and the adele class space

Number Theory 2024-01-23 v1 Algebraic Geometry Algebraic Topology Quantum Algebra

Abstract

We show that the scaling site XQX_{\mathbb Q} and its periodic orbits CpC_p of length logp\log p offer a geometric framework for the well-known analogy between primes and knots. The role of the maximal abelian cover of XQX_{\mathbb Q} is played by the quotient map π:XQabXQ\pi:X_{\mathbb Q}^{ab}\to X_{\mathbb Q} from the adele class space XQab:=Q×\AQX_{\mathbb Q}^{ab}:={\mathbb Q}^\times \backslash {\mathbb A}_{\mathbb Q} to XQ=XQab/Z^X_{\mathbb Q}=X_{{\mathbb Q}}^{ab}/{\hat{\mathbb Z}^*}. The inverse image π1(Cp)XQab\pi^{-1}(C_p)\subset X_{\mathbb Q}^{ab} of the periodic orbit CpC_p is canonically isomorphic to the mapping torus of the multiplication by the Frobenius at pp in the abelianized \'etale fundamental group π1et(SpecZ(p))ab\pi_1^{e t}({\rm Spec} \, {\mathbb Z}_{(p)})^{ab} of the spectrum of the local ring Z(p){\mathbb Z}_{(p)}, thus exhibiting the linking of pp with all other primes. In the same way as the Grothendieck theory of the \'etale fundamental group of schemes is an extension of Galois theory to schemes, the adele class space gives, as a covering of the scaling site, the corresponding extension of the class field isomorphism for Q\mathbb Q to schemes related to SpecZ{\rm Spec} \,\mathbb Z.

Cite

@article{arxiv.2401.08401,
  title  = {Knots, Primes and the adele class space},
  author = {Alain Connes and Caterina Consani},
  journal= {arXiv preprint arXiv:2401.08401},
  year   = {2024}
}

Comments

9 pages

R2 v1 2026-06-28T14:18:05.211Z