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On the Topological Entropy of Green Interval Maps
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J. Bobok
Published/Copyright:
June 4, 2010
Abstract
We investigate the topological entropy of a green interval map. Defining the complexity we estimate from above the topological entropy of a green interval map with a given complexity. The main result of the paper — stated in Theorem 0.2 — should be regarded as a completion of results of [Bobok, Fund. Math. 162: 1–36, 1999].
Received: 2000-02-24
Revised: 2000-11-27
Published Online: 2010-06-04
Published in Print: 2001-June
© Heldermann Verlag
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Articles in the same Issue
- Semistable Selfdecomposable Laws on Groups
- Topological Approach to Hemivariational Inequalities with Unilateral Growth Condition
- Generalized Solutions of a Periodic Goursat Problem
- On Almost Global Existence for the Cauchy Problem for Compressible Navier-Stokes Equations in the Lp-Framework
- Compositions of Sierpiński–Zygmund Functions from the Left
- Some Modifications of Density Topologies
- On the Topological Entropy of Green Interval Maps
- On the Continuous Dependence on Parameters of Solutions of the Fourth Order Periodic Problem
- Generalized Cantor Sets and Sets of Sums of Convergent Alternating Series
