Nonexpansive homeomorphisms
DOI10.1016/j.topol.2013.07.050zbMath1317.37018OpenAlexW4205615015MaRDI QIDQ392825
Khadija Ben Rejeb, Ezzeddine Salhi, Gioia M. Vago
Publication date: 15 January 2014
Published in: Topology and its Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.topol.2013.07.050
contractionisometryconvex setlimit setsretractnear-periodic homeomorphismnonexpansive homeomorphismperiodic homeomorphismproximity map
Dynamical systems involving homeomorphisms and diffeomorphisms of planes and surfaces (37E30) Low-dimensional dynamical systems (37E99) Notions of recurrence and recurrent behavior in topological dynamical systems (37B20)
Cites Work
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- Characterizations of almost periodic homeomorphisms
- Ends of maps. III: Dimensions 4 and 5
- The structure of \(\omega\)-limit sets for continuous functions
- Dynamics of non-expansive maps on strictly convex Banach spaces
- What sets can be \(\omega\)-limit sets in \(E^ n\)?
- Each Peano subspace of \(E^ k\) is an \(\omega\)-limit set
- Dynamics in one dimension
- On \(\omega\)-limit sets of triangular maps
- Stable homeomorphisms and the annulus conjecture
- Asymptotic behavior of nonlinear contraction semigroups
- ω-Limit sets for triangular mappings
- Nonlinear Perron–Frobenius Theory
- On conditions under which isometries have bounded orbits
- Proximity Maps for Convex Sets
- The Structure of ω-Limit Sets of Nonexpansive Maps
- A THEOREM ON PERIODIC TRANSFORMATIONS OF SPACES
- An Example of a Homeomorphism of the Plane where the Set of ω-Limit Points is not a Closed Set
- On Nonexpansive Mappings
- On the radial projection in normed spaces
- A Topological Characterization of the Dilation in E n
- Two counterexamples to a conjecture by Agronsky and Ceder
- Isometry dimension of finite groups
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