Analytic relations on a dynamical orbit

Abstract

Let (K,|·|) be a complete discretely valued field and f: B1(K,1) B1(K,1) a nonconstant analytic map from the unit back to itself. We assume that 0 is an attracting fixed point of f. Let a ∈ K with n ∞ fn(a) = 0 and consider the orbit Of(a) := \fn(a) : n ∈ N \. We show that if 0 is a superattracting fixed point, then every irreducible analytic subvariety of Bn(K,1) meeting Of(a)n in an analytically Zariski dense set is defined by equations of the form xi = b and xj = f(xk). When 0 is an attracting, non-superattracting point, we show that all analytic relations come from algebraic tori.