Higher bifurcation currents, neutral cycles and the Mandelbrot set

Abstract

We prove that given any θ1,…,θ2d-2∈ , the support of the bifurcation measure of the moduli space of degree d rational maps coincides with the closure of classes of maps having 2d-2 neutral cycles of respective multipliers e2iπθ1,…,e2iπθ2d-2. To this end, we generalize a famous result of McMullen, proving that homeomorphic copies of (∂ )k are dense in the support of the kth-bifurcation current Tk in general families of rational maps, where is the Mandelbrot set. As a consequence, we also get sharp dimension estimates for the supports of the bifurcation currents in any family.