English

Infinite global fields and the generalized Brauer--Siegel theorem

Number Theory 2007-05-23 v1 Algebraic Geometry

Abstract

The paper has two purposes. First, we start to develop a theory of infinite global fields, i.e., of infinite algebraic extensions either of Q{\mathbb{Q}} or of Fr(t){\mathbb{F}}_r(t). We produce a series of invariants of such fields, and we introduce and study a kind of zeta-function for them. Second, for sequences of number fields with growing discriminant we prove generalizations of the Odlyzko--Serre bounds and of the Brauer--Siegel theorem, taking into account non-archimedean places. This leads to asymptotic bounds on the ratio loghR/logD{{\log hR}/\log\sqrt{| D|}} valid without the standard assumption n/logD0,{n/\log\sqrt{| D|}}\to 0, thus including, in particular, the case of unramified towers. Then we produce examples of class field towers, showing that this assumption is indeed necessary for the Brauer--Siegel theorem to hold. As an easy consequence we ameliorate on existing bounds for regulators.

Keywords

Cite

@article{arxiv.math/0205129,
  title  = {Infinite global fields and the generalized Brauer--Siegel theorem},
  author = {Michael Tsfasman and Serge Vladut},
  journal= {arXiv preprint arXiv:math/0205129},
  year   = {2007}
}

Comments

81 pages, to appear in Moscow Mathematical Journal, v. 2, No. 2