Specialization results in Galois theory

Abstract

The paper has three main applications. The first one is this Hilbert-Grunwald statement. If f:X→ 1 is a degree n -cover with monodromy group Sn over , and finitely many suitably big primes p are given with partitions \dp,1,..., dp,sp\ of n, there exist infinitely many specializations of f at points t0∈ that are degree n field extensions with residue degrees dp,1,..., dp,sp at each prescribed prime p. The second one provides a description of the se-pa-ra-ble closure of a PAC field k of characteristic p=2: it is generated by all elements y such that ym-y∈ k for some m≥ 2. The third one involves Hurwitz moduli spaces and concerns fields of definition of covers. A common tool is a criterion for an \'etale algebra ΠlEl/k over a field k to be the specialization of a k-cover f:X→ B at some point t0∈ B(k). The question is reduced to finding k-rational points on a certain k-variety, and then studied over the various fields k of our applications.