Abstract :
Let K be a finite tamely ramified extension of image and let L/K be a totally ramified image-extension. Let πL be a uniformizer for L, let σ be a generator for Gal(L/K), and let f(X) be an element of image such that σ(πL)=f(πL). We show that the reduction of f(X) modulo the maximal ideal of image determines a certain subextension of L/K up to isomorphism. We use this result to study the field extensions generated by periodic points of a p-adic dynamical system.
