Algebraic stability of meromorphic maps descended from Thurston's pullback maps

Abstract

Let φ:S2 S2 be an orientation-preserving branched covering whose post-critical set has finite cardinality n. If φ has a fully ramified periodic point p∞ and satisfies certain additional conditions, then, by work of Koch, φ induces a meromorphic self-map Rφ on the moduli space M0,n; Rφ descends from Thurston's pullback map on Teichm\"uller space. Here, we relate the dynamics of Rφ on M0,n to the dynamics of φ on S2. Let be the length of the periodic cycle in which the fully ramified point p∞ lies; we show that Rφ is algebraically stable on the heavy-light Hassett space corresponding to heavy marked points and (n-) light points.