Statistical properties of quadratic polynomials with a neutral fixed point

Abstract

We describe the statistical properties of the dynamics of the quadratic polynomials Pa(z):=e2π a i z+z2 on the complex plane, with a of high return times. In particular, we show that these maps are uniquely ergodic on their measure theoretic attractors, and the unique invariant probability is a physical measure describing the statistical behavior of typical orbits in the Julia set. This confirms a conjecture of Perez-Marco on the unique ergodicity of hedgehog dynamics, in this class of maps.