J-Stability of immediately expanding polynomial maps in p-adic dynamics

Abstract

Given a family \ fλ \λ ∈ of polynomial maps of degree d where is the set of parameters, a polynomial map fλ0 is called J-stable in if there exists a neighborhood of λ0 in such that for any element λ in the neighborhood, there exists a conjugacy between the dynamics on the Julia sets of fλ and fλ0. The aim of this paper is to show that a polynomial map fλ0 over the field Cp of p-adic complex numbers is J-stable in the family of polynomial maps over Cp if fλ0 is immediately expanding.