Dimension of invariant measures for maps with exponent zero

F. Ledrappier; M. Misiurewicz

doi:10.1017/S0143385700003187

Abstract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

We give examples of maps of the interval with zero entropy for which the continuous invariant measure has no dimension, and we prove a dimension property for maps lying in the stable manifold of Feigenbaum's fixed points.

References

REFERENCES

[1]Billingsley, P.. Ergodic Theory and Information. J. Wiley and Sons, 1965.Google Scholar

[2]Brin, M. & Katok, A.. On local entropy. In Geometric Dynamics. Lect. Notes in Math. 1007 Springer (1983).CrossRef Google Scholar

[3]Campanino, M. & Epstein, H.. On the existence of Feigenbaum's fixed point. Commun. Math. Phys. 79 (1981), 261–302.CrossRef Google Scholar

[4]Collet, P. & Eckmann, J.-P.. Iterated maps on the interval as dynamical systems. Progress in Physics, Birkhäuser: Boston, 1980.Google Scholar

[5]Collet, P., Eckmann, J.-P. & Lanford, O. E.. Universal properties of maps on an interval. Commun. Math. Phys. 76 1980, 211–254.CrossRef Google Scholar

[6]Grassberger, P.. On the Hausdorff dimension of fractal attractors. Journal ofStat. Phys. 26 (1981), 173–179.CrossRef Google Scholar

[7]Khanin, K. M., Sinai, J. G. & Feigenbaum, H. B. Vul.universality and thermodynamical formalism. Uspehi 39; 3 (1984).Google Scholar

[8]Lanford, O. E.. A computer-assisted proof of the Feigenbaum conjectures. Bull Amer. Math. Soc. (New Series) 6 (1982), 427–434.CrossRef Google Scholar

[9]Ledrappier, F.. Some relations between dimension and Lyapounov exponents. Commun. Math. Phys. 81 (1981), 229–238.CrossRef Google Scholar

[10]Misiurewicz, M.. Structure of mappings of an interval with zero entropy. Publ. Math. IHES 53 (1981), 5–16.CrossRef Google Scholar

[11]Misiurewicz, M.. Attracting Cantor set of positive measure for a C^∞ map of an interval. Ergod. Th & Dynam. Sys. 2 (1982), 405–415.CrossRef Google Scholar

[12]Ruelle, D.. An inequality for the entropy of different;able maps. Bol Soc. Bras. Mat. 9 (1978), 83–87.CrossRef Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Eckmann, J.-P. and Ruelle, D. 1985. The Theory of Chaotic Attractors. p. 273.

Collet, P. Lebowitz, J. L. and Porzio, A. 1987. The dimension spectrum of some dynamical systems. Journal of Statistical Physics, Vol. 47, Issue. 5-6, p. 609.

Paladin, Giovanni and Vulpiani, Angelo 1987. Anomalous scaling laws in multifractal objects. Physics Reports, Vol. 156, Issue. 4, p. 147.

Bessis, D. Paladin, G. Turchetti, G. and Vaienti, S. 1988. Generalized dimensions, entropies, and Liapunov exponents from the pressure function for strange sets. Journal of Statistical Physics, Vol. 51, Issue. 1-2, p. 109.

Vaienti, S 1988. Some properties of mixing repellers. Journal of Physics A: Mathematical and General, Vol. 21, Issue. 9, p. 2023.

Turchetti, G. and Vaienti, S. 1988. Analytical estimates of fractal and dynamical properties for one-dimensional expanding maps. Physics Letters A, Vol. 128, Issue. 6-7, p. 343.

Collet, P. 1988. Dynamical Systems Valparaiso 1986. Vol. 1331, Issue. , p. 47.

Nowicki, T. and van Strien, S. 1988. Absolutely continuous invariant measures forC 2 unimodal maps satisfying the Collet-Eckmann conditions. Inventiones mathematicae, Vol. 93, Issue. 3, p. 619.

Kovacs, Z 1989. Universal f(α) spectrum as an eigenvalue. Journal of Physics A: Mathematical and General, Vol. 22, Issue. 23, p. 5161.

Paladin, G. and Vaienti, S. 1989. Hausdorff dimensions in two-dimensional maps and thermodynamic formalism. Journal of Statistical Physics, Vol. 57, Issue. 1-2, p. 289.

Keller, Gerhard 1989. Lifting measures to Markov extensions. Monatshefte f�r Mathematik, Vol. 108, Issue. 2-3, p. 183.

Blokh, A. M. and Lyubich, M. Yu. 1990. Measure of solenoidal attractors of unimodal maps of the segment. Mathematical Notes of the Academy of Sciences of the USSR, Vol. 48, Issue. 5, p. 1085.

Vaienti, S 1991. A Frostman-like theorem for the wavelet transform on fractal sets. Nonlinearity, Vol. 4, Issue. 4, p. 1241.

Ghez, J. -M. and Vaienti, S. 1991. Large Scale Structures in Nonlinear Physics. Vol. 392, Issue. , p. 320.

Cutler, C. D. 1991. Some results on the behavior and estimation of the fractal dimensions of distributions on attractors. Journal of Statistical Physics, Vol. 62, Issue. 3-4, p. 651.

Shereshevsky, M A 1991. A complement to Young's theorem on measure dimension: the difference between lower and upper pointwise dimensions. Nonlinearity, Vol. 4, Issue. 1, p. 15.

Fisher, Albert M. 1993. Integer Cantor sets and an order-two ergodic theorem. Ergodic Theory and Dynamical Systems, Vol. 13, Issue. 1, p. 45.

Pesin, Ya. B. 1993. On rigorous mathematical definitions of correlation dimension and generalized spectrum for dimensions. Journal of Statistical Physics, Vol. 71, Issue. 3-4, p. 529.

Arneodo, A Bacry, E and Muzy, J. F 1994. Solving the Inverse Fractal Problem from Wavelet Analysis. Europhysics Letters (EPL), Vol. 25, Issue. 7, p. 479.

Arneodo, A. Bacry, E. and Muzy, J.F. 1995. The thermodynamics of fractals revisited with wavelets. Physica A: Statistical Mechanics and its Applications, Vol. 213, Issue. 1-2, p. 232.

Download full list

Article contents

Dimension of invariant measures for maps with exponent zero

Abstract

References

REFERENCES

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests