Equidistribution speed for endomorphisms of projective spaces

Abstract

Let f be a non-invertible holomorphic endomorphism of the complex projective space Pk, fn its iterate of order n and μ the equilibrium measure of f. We estimate the speed of convergence in the following known result. If a is a Zariski generic point in Pk, the probability measures, equidistributed on the preimages of a under fn, converge to μ as n goes to infinity.