Iterated extensions and the ramification dichotomy

Abstract

Let K/ Qp be finite and let f∈ OK[X] be monic, of degree at least two, with f'(X)∈ mK OK[X], equivalently f∈ k[Xp]. For a compatible inverse branch f(tn+1)=tn with t0∈ OK, put Kn=K(tn) and K∞=nKn. We prove that K∞/K is either unramified or deeply ramified. More precisely, once ramification appears, the ramification indices over the maximal unramified subfields tend to infinity and the finite-level differents are unbounded. In the Frobenius-type case f(X) Xpa mK the unramified alternative is trivial, so K∞=K or K∞/K is deeply ramified. After completion, the non-unramified alternative gives perfectoid fields and examples show that APF property need not hold at the algebraic level.