Mathematics – Dynamical Systems
Scientific paper
2011-11-03
Mathematics
Dynamical Systems
15 pages. Author's affiliation updated in second version; main text unchanged
Scientific paper
It is well known that \omega-limit sets are internally chain transitive and have weak incompressibility; the converse is not generally true, in either case. However, it has been shown that a set is weakly incompressible if and only if it is an abstract \omega-limit set, and separately that in shifts of finite type, a set is internally chain transitive if and only if it is a (regular) \omega-limit set. In this paper we generalise these and other results, proving that the characterization for shifts of finite type holds in a variety of topologically hyperbolic systems (defined in terms of expansive and shadowing properties), and also show that the notions of internal chain transitivity and weak incompressibility coincide in compact metric spaces.
Barwell Andrew
Good Chris
Oprocha Piotr
Raines Brian
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