Spherical normal forms for germs of parabolic line biholomorphisms

Abstract

We address the inverse problem for holomorphic germs of a tangent-to-identity mapping of the complex line near a fixed point. We provide a preferred (family of) parabolic map realizing a given Birkhoff--\'Ecalle-Voronin modulus and prove its uniqueness in the functional class we introduce. The germ is the time-1 map of a Gevrey formal vector field admitting meromorphic sums on a pair of infinite sectors covering the Riemann sphere. For that reason, the analytic continuation of is a multivalued map admitting finitely many branch points with finite monodromy. In particular is holomorphic and injective on an open slit sphere containing 0 (the initial fixed point) and ∞, where sits the companion parabolic point under the involution -1. It turns out that the Birkhoff--\'Ecalle-Voronin modulus of the parabolic germ at ∞ is the inverse -1 of that at 0.