Good reduction and Shafarevich-type theorems for dynamical systems with portrait level structures

Abstract

Let K be a number field, let S be a finite set of places of K, and let RS be the ring of S-integers of K. A K-morphism f:P1K1K has simple good reduction outside S if it extends to an RS-morphism P1RS1RS. A finite Galois invariant subset X⊂P1K(K) has good reduction outside S if its closure in P1RS is \'etale over RS. We study triples (f,Y,X) with X=Y f(Y). We prove that for a fixed K, S, and d, there are only finitely many PGL2(RS)-equivalence classes of triples with deg(f)=d and ΣP∈ Yef(P)2d+1 and X having good reduction outside S. We consider refined questions in which the weighted directed graph structure on f:Y X is specified, and we give an exhaustive analysis for degree 2 maps on P1 when Y=X.