Horn maps of holomorphic functions locally pseudo-conjugate on their parabolic basins

Abstract

The lifted horn map of a holomorphic function with a simple parabolic point is well known to be a complete local conjugacy invariant; this is a classical result proved independently by \'Ecalle, Voronin, Martinet and Ramis. Lanford and Yampolski have shown that, if two functions f1, f2 with simple parabolic points at z1, z2 are globally conjugate on their immediate parabolic basins, with the conjugacy and its inverse continuous at z1, resp. z2, then their horn maps must be cover-equivalent: there are isomorphisms + : D1+ D2+ and - : D1- D2- between the top and bottom connected components of their domains, and a translation T on the cylinder, such that h2+ = T h1 and h2- = T h1 holds on these domains. In this article, we introduce a notion of (semi) local conjugacy on immediate parabolic basins, which we call local pseudo-conjugacy and which in particular does not make any continuity assumption, and show that the horn maps h1 and h2 satisfy the condition above if and only if the two functions f1, f2 are locally pseudo-conjugate. This result is a first step to better understand invariant classes by parabolic renormalization.