English

Robust entropy expansiveness implies generic domination

Dynamical Systems 2015-05-13 v3

Abstract

Let f:MMf: M \to M be a CrC^r-diffeomorphism, r1r\geq 1, defined on a compact boundaryless dd-dimensional manifold MM, d2d\geq 2, and let H(p)H(p) be the homoclinic class associated to the hyperbolic periodic point pp. We prove that if there exists a C1C^1 neighborhood U\mathcal{U} of ff such that for every gUg\in {\mathcal U} the continuation H(pg)H(p_g) of H(p)H(p) is entropy-expansive then there is a DfDf-invariant dominated splitting for H(p)H(p) of the form EF1...FcGE\oplus F_1\oplus... \oplus F_c\oplus G where EE is contracting, GG is expanding and all FjF_j are one dimensional and not hyperbolic.

Keywords

Cite

@article{arxiv.0903.2948,
  title  = {Robust entropy expansiveness implies generic domination},
  author = {M. J. Pacifico and J. L. Vieitez},
  journal= {arXiv preprint arXiv:0903.2948},
  year   = {2015}
}

Comments

24 pages

R2 v1 2026-06-21T12:41:30.468Z