Dynamics on ¹: preperiodic points and pairwise stability

DeMarco, Krieger, and Ye conjectured that there is a uniform bound B, depending only on the degree d, so that any pair of holomorphic maps f, g : P-1 -* P-1 with degree d will either share all of their preperiodic points or have at most B in common. Here we show that this uniform bound holds for a Zariski open and dense set in the space of all pairs, Rat(d) x Rat(d), for each degree d >= 2. The proof involves a combination of arithmetic intersection theory and complex -dynamical results, especially as developed recently by Gauthier and Vigny, Yuan and Zhang, and Mavraki and Schmidt. In addition, we present alternate proofs of the main results of DeMarco, Krieger, and Ye [Uniform Manin-Mumford for a family of genus 2 curves, Ann. of Math. (2) 191 (2020), 949-1001; Common preperiodic points for quadratic polynomials, J. Mod. Dyn. 18 (2022), 363-413] and of Poineau [Dynamique analytique sur Z II : & Eacute;cart uniforme entre Latt`es et conjecture de Bogomolov-Fu-Tschinkel, Preprint (2022), arXiv:2207.01574 [math.NT]]. In fact, we prove a generalization of a conjecture of Bogomolov, Fu, and Tschinkel in a mixed setting of dynamical systems and elliptic curves.