Valiron and Abel equations for holomorphic self-maps of the polydisc

Abstract

We introduce a notion of hyperbolicity and parabolicity for a holomorphic self-map f: N N of the polydisc which does not admit fixed points in N. We generalize to the polydisc two classical one-variable results: we solve the Valiron equation for a hyperbolic f and the Abel equation for a parabolic nonzero-step f. This is done by studying the canonical Kobayashi hyperbolic semi-model of f and by obtaining a normal form for the automorphisms of the polydisc. In the case of the Valiron equation we also describe the space of all solutions.