Structure of Julia sets for post-critically finite endomorphisms on p2

Abstract

Let f be a post-critically finite endomorphism (PCF map for short) on P2, let J1 denote the Julia set and let J2 denote the support of the measure of maximal entropy. In this paper we show that: 1. J1 J2 is contained in the union of the (finitely many) basins of critical component cycles and stable manifolds of sporadic super-saddle cycles. 2. For every x∈ J2 which is not contained in the stable manifold of a sporadic super-saddle cycle, there is no Fatou disk containing x. Here sporadic means that the super-saddle cycle is not contained in a critical component cycle. Under the additional assumption that all branches of PC(f) are smooth and intersect transversally, we show that there is no sporadic super-saddle cycle. Thus in this case J1 J2 is contained in the union of the basins of critical component cycles, and for every x∈ J2 there is no Fatou disk containing x. As consequences of our result: 1.We answer some questions of Fornaess-Sibony about the non-wandering set for PCF maps on P2 with no sporadic super-saddle cycles. 2. We give a new proof of de Th\'elin's laminarity of the Green current in J1 J2 for PCF maps on P2. 3. We show that for PCF maps on P2 an invariant compact set is expanding if and only if it does not contain critical points, and we obtain characterizations of PCF maps on P2 which are expanding on J2 or satisfy Axiom A.