Equidistribution of the zeros of higher order derivatives in polynomial dynamics

Abstract

For every m∈N, we establish the convergence of the averaged distributions of the zeros of the m-th order derivatives (fn)(m) of the iterated polynomials fn of a polynomial f∈C[z] of degree >1 towards the harmonic measure of the filled-in Julia set of f with pole at ∞ as n+∞, when f has no exceptional points in C. This complements our former study on the zeros of (fn)(m)-a for any value a∈C\0\. The key in the proof is an approximation of the higher order derivatives of a solution of the Schr\"oder or Abel functional equations for a meromorphic function on C with a locally uniform non-trivial error estimate.