Galois specialization to symmetric points and the inverse Galois problem up to Sn
Abstract
The paper is concerned with the following version of Hilbert's irreducibility theorem: if π: X Y is a Galois G-covering of varieties over a number field k and H ⊂ G is a subgroup, then for all sufficiently large and sufficiently divisible n there exist a degree n closed point y ∈ |Y| and x ∈ π-1(y) for which k(x)/k(y) is a Galois H-extension, and k(y)/k is an Sn-extension. The result has interesting corollaries when applied to moduli spaces of various kinds. For instance, for every finite group G there is a constant N such that for all n>N there is a degree n, Sn-extension F/Q such that over F the inverse Galois problem for G has a solution.
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