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Generic homeomorphisms have full metric mean dimension

MARIA CARVALHO, FAGNER B. RODRIGUES, PAULO VARANDAS

2020Ergodic Theory and Dynamical Systems13 citationsDOIOpen Access PDF

Abstract

Abstract We prove that for $C^0$ -generic homeomorphisms, acting on a compact smooth boundaryless manifold with dimension greater than one, the upper metric mean dimension with respect to the smooth metric coincides with the dimension of the manifold. As an application, we show that the upper box dimension of the set of periodic points of a $C^0$ -generic homeomorphism is equal to the dimension of the manifold. In the case of continuous interval maps, we prove that each level set for the metric mean dimension with respect to the Euclidean distance is $C^0$ -dense in the space of continuous endomorphisms of $[0,1]$ with the uniform topology. Moreover, the maximum value is attained at a $C^0$ -generic subset of continuous interval maps and a dense subset of metrics topologically equivalent to the Euclidean distance.

Topics & Concepts

MathematicsDimension (graph theory)Interval (graph theory)Minkowski–Bouligand dimensionInductive dimensionMetric spaceEndomorphismMetric (unit)Manifold (fluid mechanics)Homeomorphism (graph theory)Euclidean distanceEuclidean spaceCombinatoricsPacking dimensionEuclidean geometryPure mathematicsDimension functionHausdorff dimensionUniform continuityMathematical analysisDiscrete mathematicsClosed setEffective dimensionReal lineInjective metric spaceLebesgue covering dimensionUpper and lower boundsSpace (punctuation)Complex dimensionMetric dimensionTopology (electrical circuits)Dimension theory (algebra)Set (abstract data type)Mathematical Dynamics and FractalsAnalytic and geometric function theoryFixed Point Theorems Analysis
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