Reading analytic invariants of parabolic diffeomorphisms from their orbits

Abstract

In this paper we study germs of diffeomorphisms in the complex plane. We address the following problem: How to read a diffeomorphism f knowing one of its orbits A? We solve this problem for parabolic germs. This is done by associating to the orbit A a function that we call the dynamic theta function A. We prove that the function A is 2π iZ-resurgent. We show that one can obtain the sectorial Fatou coordinate as a Laplace-type integral transform of the function A. This enables one to read the analytic invariants of a diffeomorphism from the theta function of one of its orbits. We also define a closely related fractal theta function A, which is inspired by and generalizes the geometric zeta function of a fractal string, and show that it also encodes the analytic invariants of the diffeomorphism.

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