English

Hyperbolic components in spaces of polynomial maps

Dynamical Systems 2009-09-25 v1

Abstract

We consider polynomial maps f:\C\Cf:\C\to\C of degree d2d\ge 2, or more generally polynomial maps from a finite union of copies of \C\C to itself which have degree two or more on each copy. In any space \pS\p^{S} of suitably normalized maps of this type, the post-critically bounded maps form a compact subset \clS\cl^{S} called the connectedness locus, and the hyperbolic maps in \clS\cl^{S} form an open set \hlS\hl^{S} called the hyperbolic connectedness locus. The various connected components Hα\hlSH_\alpha\subset \hl^{S} are called hyperbolic components. It is shown that each hyperbolic component is a topological cell, containing a unique post-critically finite map which is called its center point. These hyperbolic components can be separated into finitely many distinct ``types'', each of which is characterized by a suitable reduced mapping schema Sˉ(f)\bar S(f). This is a rather crude invariant, which depends only on the topology of ff restricted to the complement of the Julia set. Any two components with the same reduced mapping schema are canonically biholomorphic to each other. There are similar statements for real polynomial maps, or for maps with marked critical points.

Keywords

Cite

@article{arxiv.math/9202210,
  title  = {Hyperbolic components in spaces of polynomial maps},
  author = {John W. Milnor and Alfredo Poirier},
  journal= {arXiv preprint arXiv:math/9202210},
  year   = {2009}
}

Comments

Main text by John W. Milnor, appendix by Alfredo Poirier. Fonts changed by arXiv admin to fix compilation problem (Dec2002)