Poincare linearizers in higher dimensions

Abstract

It is well-known that a holomorphic function near a repelling fixed point may be conjugated to a linear function. The function which conjugates is called a Poincar\'e linearizer and may be extended to a transcendental entire function in the plane. In this paper, we study the dynamics of a higher dimensional generalization of Poincar\'e linearizers. These arise by conjugating a uniformly quasiregular mapping in m near a repelling fixed point to the mapping x 2x. In particular, we show that the fast escaping set of such a linearizer has a spider's web structure.