Author:
BARWELL ANDREW D.,RAINES BRIAN E.
Abstract
AbstractIn this paper we characterize $\omega $-limit sets of dendritic Julia sets for quadratic maps. We use Baldwin’s symbolic representation of these spaces as a non-Hausdorff itinerary space and prove that quadratic maps with dendritic Julia sets have shadowing, and also that for all such maps, a closed invariant set is an $\omega $-limit set of a point if, and only if, it is internally chain transitive.
Publisher
Cambridge University Press (CUP)
Subject
Applied Mathematics,General Mathematics
Cited by
12 articles.
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2. On genericity of shadowing in one dimension;Fundamenta Mathematicae;2021
3. Expansivity and unique shadowing;Proceedings of the American Mathematical Society;2020-11-25
4. Shadowing, internal chain transitivity and α-limit sets;Journal of Mathematical Analysis and Applications;2020-11
5. Preservation of shadowing in discrete dynamical systems;Journal of Mathematical Analysis and Applications;2020-05