English

Higher genus theory

Number Theory 2021-03-09 v2

Abstract

In 18011801, Gauss found an explicit description, in the language of binary quadratic forms, for the 22-torsion of the narrow class group and dual narrow class group of a quadratic number field. This is now known as Gauss's genus theory. In this paper we extend Gauss's work to the setting of multi-quadratic number fields. To this end, we introduce and parametrize the categories of expansion groups and expansion Lie algebras, giving an explicit description for the universal objects of these categories. This description is inspired by the ideas of Smith \cite{smith2} in his recent breakthrough on Goldfeld's conjecture and the Cohen--Lenstra conjectures. Our main result shows that the maximal unramified multi-quadratic extension LL of a multi-quadratic number field KK can be reconstructed from the set of generalized governing expansions supported in the set of primes that ramify in KK. This provides an explicit description for the group Gal(L/Q)\text{Gal}(L/\mathbb{Q}) and a systematic procedure to construct the field LL. A special case of our main result gives a sharp upper bound for the size of Cl+(K)[2]\text{Cl}^{+}(K)[2]. For every positive integer nn, we find infinitely many multi-quadratic number fields KK such that [K:Q][K:\mathbb{Q}] equals 2n2^n and Gal(L/Q)\text{Gal}(L/\mathbb{Q}) is a universal expansion group. Such fields KK are obtained using Smith's notion of additive systems and their basic Ramsey-theoretic behavior.

Keywords

Cite

@article{arxiv.1909.13871,
  title  = {Higher genus theory},
  author = {Peter Koymans and Carlo Pagano},
  journal= {arXiv preprint arXiv:1909.13871},
  year   = {2021}
}

Comments

Shortened and accepted version. Parts of v1 now appear in "A sharp upper bound for the $2$-torsion of class groups of multiquadratic fields"

R2 v1 2026-06-23T11:30:37.193Z