Fixed point indices of planar continuous maps

Abstract

We characterize the sequences of fixed point indices \i(fn, p)\n 1 of fixed points that are isolated as an invariant set and continuous maps in the plane. In particular, we prove that the sequence is periodic and i(fn, p) 1 for every n 1. This characterization allows us to compute effectively the Lefschetz zeta functions for a wide class of continuous maps in the 2-sphere, to obtain new results of existence of infinite periodic orbits inspired on previous articles of J. Franks and to give a partial answer to a problem of Shub about the growth of the number of periodic orbits of degree--d maps in the 2-sphere.