Rigidity of valuative trees under henselization

Abstract

Let (K,v) be a valued field and let (Kh,vh) be the henselization determined by the choice of an extension of v to an algebraic closure of K. Consider an embedding v(K*) of the value group into a divisible ordered abelian group. Let T(K,), T(Kh,) be the trees formed by all -valued extensions of v, vh to the polynomial rings K[x], Kh[x], respectively. We show that the natural restriction mapping T(Kh,) T(K,) is an isomorphism of posets. As a consequence, the restriction mapping Tv Tvh is an isomorphism of posets too, where Tv, Tvh are the trees whose nodes are the equivalence classes of valuations on K[x], Kh[x] whose restriction to K, Kh are equivalent to v, vh, respectively.