Sparsity of postcritically finite maps of Pk and beyond: A complex analytic approach

Abstract

An endomorphism f:Pkk of degree d≥2 is said to be postcritically finite (or PCF) if its critical set Crit(f) is preperiodic, i.e. if there are integers m>n≥0 such that fm(Crit(f))⊂eq fn(Crit(f)). When k≥2, it was conjectured by Ingram, Ramadas and Silverman that, in the space Enddk of all endomorphisms of degree d of Pk, such endomorphisms are not Zariski dense. We prove this conjecture. Further, in the space Polyd2 of all regular polynomial endomorphisms of degree d≥2 of the affine plane A2, we construct a dense and Zariski open subset where we have a uniform bound on the number of preperiodic points lying in the critical set. The proofs are a combination of the theory of heights in arithmetic dynamics and methods from real dynamics to produce open subsets with maximal bifurcation.