Equidistribution speed of iterated preimages for rational maps on the Riemann sphere

Abstract

The exponential equidistribution speed of iterated preimages for holomorphic endomorphisms on Pk was established by Drasin-Okuyama for k=1, and by Dinh-Sibony for arbitrary k. In this paper, we obtain a near-optimal equidistribution speed with order O(nd-n) in dimension one for points that are not super-attracting periodic. Moreover, the equidistribution speed order O(nd-n) holds not only for C2 observables but also for H\"older continuous d.s.h. observables. For geometrically finite rational maps (including all hyperbolic rational maps), we prove that the equidistribution speed order is O(d-n) for C2 observables and points that are not super-attracting, attracting, or parabolic periodic.