English

Sieves and the Minimal Ramification Problem

Number Theory 2020-05-06 v1

Abstract

The minimal ramification problem may be considered as a quantitative version of the inverse Galois problem. For a nontrivial finite group GG, let m(G)m(G) be the minimal integer mm for which there exists a Galois extension N/QN/\mathbb{Q} that is ramified at exactly mm primes (including the infinite one). So, the problem is to compute or to bound m(G)m(G). In this paper, we bound the ramification of extensions N/QN/\mathbb{Q} obtained as a specialization of a branched covering ϕ ⁣:CPQ1\phi\colon C\to \mathbb{P}^1_{\mathbb{Q}}. This leads to novel upper bounds on m(G)m(G), for finite groups GG that are realizable as the Galois group of a branched covering. Some instances of our general results are: 1m(Sm)4\mboxandnm(Smn)n+4, 1\leq m(S_m)\leq 4 \quad \mbox{and} \quad n\leq m(S_m^n) \leq n+4, for all n,m>0n,m>0. Here SmS_m denotes the symmetric group on mm letters, and SmnS_m^n is the direct product of nn copies of SmS_m. We also get the correct asymptotic of m(Gn)m(G^n), as nn \to \infty for a certain class of groups GG. Our methods are based on sieve theory results, in particular on the Green-Tao-Ziegler theorem on prime values of linear forms in two variables, on the theory of specialization in arithmetic geometry, and on finite group theory.

Keywords

Cite

@article{arxiv.1602.03662,
  title  = {Sieves and the Minimal Ramification Problem},
  author = {Lior Bary-Soroker and Tomer M. Schlank},
  journal= {arXiv preprint arXiv:1602.03662},
  year   = {2020}
}
R2 v1 2026-06-22T12:48:13.531Z