Odoni's conjecture for number fields
Abstract
Let K be a number field, and let d≥ 2. A conjecture of Odoni (stated more generally for characteristic zero Hilbertian fields K) posits that there is a monic polynomial f∈ K[x] of degree d, and a point x0∈ K, such that for every n≥ 0, the so-called arboreal Galois group Gal(K(f-n(x0))/K) is an n-fold wreath product of the symmetric group Sd. In this paper, we prove Odoni's conjecture when d is even and K is an arbitrary number field, and also when both d and [K:Q] are odd.
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