English

Monotone Maps on dendrites and their induced maps

Dynamical Systems 2015-07-24 v1

Abstract

A continuum XX is a dendrite if it is locally connected and contains no simple closed curve, a self mapping ff of XX is called monotone if the preimage of any connected subset of XX is connected. If XX is a dendrite and f:XXf:X\to X is a monotone continuous map then we prove that any ω\omega-limit set is approximated by periodic orbits and the family of all ω\omega-limit sets is closed with respect to the Hausdorff metric. Second, we prove that the equality between the closure of the set of periodic points, the set of regularly recurrent points and the union of all ω\omega-limit sets holds for the induced maps Fn(f):Fn(X)Fn(X)\mathcal{F}_n(f):\mathcal{F}_n(X)\to \mathcal{F}_n(X) and Tn(f):Tn(X)Tn(X)\mathcal{T}_n(f):\mathcal{T}_n(X)\to \mathcal{T}_n(X) where Fn(X)\mathcal{F}_n(X) denotes the family of finite subsets of XX with at most nn points, Tn(X)\mathcal{T}_n(X) denotes the family of subtrees of XX with at most nn endpoints and Fn(f)=2Fn(X)f\mathcal{F}_n(f)=2^f_{\mid\mathcal{F}_n(X)}, Tn(f)=2Tn(X)f\mathcal{T}_n(f)=2^f_{\mid\mathcal{T}_n(X)}, in particular there is no Li-Yorke pair for these maps. However, we will show that this rigidity in general is not exhibited by the induced map C(f):C(X)C(X)\mathcal{C}(f):\mathcal{C}(X)\to \mathcal{C}(X) where C(X)\mathcal{C}(X) denotes the family of sub-continua of XX and C(f)=2C(X)f\mathcal{C}(f)=2^f_{\mid\mathcal{C}(X)}, we will discuss an example of a homeomorphism gg on a dendrite SS which is dynamically simple whereas its induced map C(g)\mathcal{C}(g) is ω\omega-chaotic and has infinite topological entropy.

Keywords

Cite

@article{arxiv.1507.06532,
  title  = {Monotone Maps on dendrites and their induced maps},
  author = {Haithem Abouda and Issam Naghmouchi},
  journal= {arXiv preprint arXiv:1507.06532},
  year   = {2015}
}

Comments

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R2 v1 2026-06-22T10:17:13.274Z