English

Periodic points of post-critically algebraic endomorphisms

Dynamical Systems 2021-10-19 v2 Complex Variables

Abstract

A holomorphic endomorphism of CPn\mathbb{CP}^n is post-critically algebraic if its critical hypersurfaces are periodic or preperiodic. This notion generalizes the notion of post-critically finite rational maps in dimension one. We will study the eigenvalues of the differential of such a map along a periodic cycle. When n=1n=1, a well-known fact is that the eigenvalue along a periodic cycle of a post-critically finite rational map is either superattracting or repelling. We prove that when n=2n=2 the eigenvalues are still either superattracting or repelling. This is an improvement of a result by Mattias Jonsson. When n2n\geq 2 and the cycle is outside the post-critical set, we prove that the eigenvalues are repelling. This result improves one which was already obtained by Fornaess and Sibony under a hyperbolicity assumption on the complement of the post-critical set.

Keywords

Cite

@article{arxiv.1906.04097,
  title  = {Periodic points of post-critically algebraic endomorphisms},
  author = {Van Tu Le},
  journal= {arXiv preprint arXiv:1906.04097},
  year   = {2021}
}

Comments

30 pages, 4 figures, updated title

R2 v1 2026-06-23T09:49:05.391Z