Special curves and postcritically-finite polynomials

Abstract

We study the postcritically-finite (PCF) maps in the moduli space of complex polynomials MPd. For a certain class of rational curves C in MPd, we characterize the condition that C contains infinitely many PCF maps. In particular, we show that if C is parameterized by polynomials, then there are infinitely many PCF maps in C if and only if there is exactly one active critical point along C, up to symmetries; we provide the critical orbit relation satisfied by any pair of active critical points. For the curves Per1(λ) in the space of cubic polynomials, introduced by Milnor (1992), we show that Per1(λ) contains infinitely many PCF maps if and only if λ=0. The proofs involve a combination of number-theoretic methods (specifically, arithmetic equidistribution) and complex-analytic techniques (specifically, univalent function theory). We provide a conjecture about Zariski density of PCF maps in subvarieties of the space of rational maps, in analogy with the Andr\'e-Oort Conjecture from arithmetic geometry.