Invariant sets with zero measure and full Hausdorff dimension.
Barreira, Luis, Schmeling, Jörg (1997)
Electronic Research Announcements of the American Mathematical Society [electronic only]
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Displaying similar documents to “Multifractal dimensions for invariant subsets of piecewise monotonic interval maps”
Invariant sets with zero measure and full Hausdorff dimension.
Semicontinuity of dimension and measure for locally scaling fractals
L. B. Jonker, J. J. P. Veerman (2002)
Fundamenta Mathematicae
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The basic question of this paper is: If you consider two iterated function systems close to each other in an appropriate topology, are the dimensions of their respective invariant sets close to each other? It is well known that the Hausdorff dimension (and Lebesgue measure) of the invariant set does not depend continuously on the iterated function system. Our main result is that (with a restriction on the "non-conformality" of the transformations) the Hausdorff dimension is a lower semicontinuous...
On the existence of an invariant measure for the dynamical system generated by partial differential equation
Antoni Leon Dawidowicz (1983)
Annales Polonici Mathematici
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Quantization Dimension Function and Ergodic Measure with Bounded Distortion
Mrinal Kanti Roychowdhury (2009)
Bulletin of the Polish Academy of Sciences. Mathematics
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The quantization dimension function for the image measure of a shift-invariant ergodic measure with bounded distortion on a self-conformal set is determined, and its relationship to the temperature function of the thermodynamic formalism arising in multifractal analysis is established.
Smoothness of invariant density for expanding transformations in higher dimensions.
Adl-Zarabi, Kourosh, Proppe, Harald (2000)
Journal of Applied Mathematics and Stochastic Analysis
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Separation conditions on controlled Moran constructions
Antti Käenmäki, Markku Vilppolainen (2008)
Fundamenta Mathematicae
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It is well known that the open set condition and the positivity of the t-dimensional Hausdorff measure are equivalent on self-similar sets, where t is the zero of the topological pressure. We prove an analogous result for a class of Moran constructions and we study different kinds of Moran constructions in this respect.
Invariant measures and ergodic properties of number theoretical endomorphisms
F. Schweiger (1989)
Banach Center Publications
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Expanding repellers in limit sets for iterations of holomorphic functions
Feliks Przytycki (2005)
Fundamenta Mathematicae
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We prove that for Ω being an immediate basin of attraction to an attracting fixed point for a rational mapping of the Riemann sphere, and for an ergodic invariant measure μ on the boundary FrΩ, with positive Lyapunov exponent, there is an invariant subset of FrΩ which is an expanding repeller of Hausdorff dimension arbitrarily close to the Hausdorff dimension of μ. We also prove generalizations and a geometric coding tree abstract version. The paper is a continuation of a paper in Fund....
On the Pointwise Ergodic Theorem in
F. Martín-Reyes, A. de la Torre (1994)
Studia Mathematica
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Invariant measures for piecewise convex transformations of an interval
Christopher Bose, Véronique Maume-Deschamps, Bernard Schmitt, S. Sujin Shin (2002)
Studia Mathematica
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We investigate the existence and ergodic properties of absolutely continuous invariant measures for a class of piecewise monotone and convex self-maps of the unit interval. Our assumption entails a type of average convexity which strictly generalizes the case of individual branches being convex, as investigated by Lasota and Yorke (1982). Along with existence, we identify tractable conditions for the invariant measure to be unique and such that the system has exponential decay of correlations...
Ergodic properties of skew products withfibre maps of Lasota-Yorke type
Zbigniew Kowalski (1994)
Applicationes Mathematicae
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We consider the skew product transformation T(x,y)= (f(x), ) where f is an endomorphism of a Lebesgue space (X,A,p), e : X → S and is a family of Lasota-Yorke type maps of the unit interval into itself. We obtain conditions under which the ergodic properties of f imply the same properties for T. Consequently, we get the asymptotical stability of random perturbations of a single Lasota-Yorke type map. We apply this to some probabilistic model of the motion of cogged bits in the rotary...
On the dimensions of certain incommensurably constructed sets.
Veerman, J.J.P., Stošić, B.D. (2000)
Experimental Mathematics
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Measures of full dimension on self-affine sets
Antti Käenmäki (2004)
Acta Universitatis Carolinae. Mathematica et Physica
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Generic Properties of Continuous Iterated Function Systems with Place Dependent Probabilities
Tomasz Bielaczyc (2007)
Bulletin of the Polish Academy of Sciences. Mathematics
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It is shown that for a typical continuous learning system defined on a compact convex subset of ℝⁿ the Hausdorff dimension of its invariant measure is equal to zero.
Absolutely continuous, invariant measures for dissipative, ergodic transformations
Jon Aaronson, Tom Meyerovitch (2008)
Colloquium Mathematicae
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We show that a dissipative, ergodic measure preserving transformation of a σ-finite, non-atomic measure space always has many non-proportional, absolutely continuous, invariant measures and is ergodic with respect to each one of these.
The Box Dimension of Completely Invariant Subsets for Expanding Piecewise Monotonic Transformations.
Franz Hofbauer (1996)
Monatshefte für Mathematik
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Contracting-on-Average Baker Maps
Michał Rams (2006)
Bulletin of the Polish Academy of Sciences. Mathematics
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We estimate from above and below the Hausdorff dimension of SRB measure for contracting-on-average baker maps.
Two variants of Sperner's lemma with application to invariance of dimension theorems
R. Đorđević (1989)
Matematički Vesnik
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