Discreteness of postcritically finite maps in p-adic moduli space

Abstract

Let p ≥ 2 be a prime number and let Cp be the completion of an algebraic closure of the p-adic rational field Qp. Let fc(z) be a one-parameter family of rational functions of degree d≥ 2, where the coefficients are meromorphic functions defined at all parameters c in some open disk D⊂eqCp. Assuming an appropriate stability condition, we prove that the parameters c for which fc is postcritically finite (PCF) are isolated from one another in the p-adic disk D, except in certain trivial cases. In particular, all PCF parameters of the family fc(z)=zd+c are p-adically isolated.