Stochastic stability of hyperbolic attractors

Lai-Sang Young

doi:10.1017/S0143385700003473

Abstract

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We study the effects of small random errors on the asymptotic distribution of points in the basin of a hyperbolic attractor.

References

REFERENCES

[B]Bowen, R.. Equilibrium States and the Ergodic Theory of Anosov Diffeomorphisms. Lecture Notes in Math, Vol. 470, Springer-Verlag (1975).CrossRef Google Scholar

[BR]Bowen, R. & Ruelle, D.. The ergodic theory of Axiom A flows. Invent. Math. 29 (1975), 181–202.CrossRef Google Scholar

[F]Franks, J.. Time dependent stable diffeomorphisms. Invent. Math. 24 (1974), 163–172.CrossRef Google Scholar

[HP]Hirsch, M. & Pugh, C.. Stable manifolds and hyperbolic sets. AMS Proc. Symp. Pure Math. Vol. 14, (1970), 133–164.CrossRef Google Scholar

[K1]Kifer, Y.. On small random perturbations of some smooth dynamical systems. Math. USSR Izvestija 8 (1974) 1083–1107.CrossRef Google Scholar

[K2]Kifer, Y.. General random perturbations of hyperbolic and expanding transformations. Preprint.Google Scholar

[PS]Pugh, C. & Shub, M.. Ergodicity of Anosov actions. Invent. Math. 15 (1972) 1–23.CrossRef Google Scholar

[Sh]Shub, M.. Stabilité globale des systemes dynamiques. Asterisque vol. 56 (1978). (English translation by J. Christy to appear.)Google Scholar

[Si]Sinai, Ya. G.. Markov partitions and C-diffeomorphisms. Func. Anal. and its Appl. 2 (1968), No. 1, 64–89.Google Scholar

Crossref Citations

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Coven, Ethan M. Kan, Ittai and Yorke, James A. 1988. Pseudo-orbit shadowing in the family of tent maps. Transactions of the American Mathematical Society, Vol. 308, Issue. 1, p. 227.

Martinelli, Fabio and Scoppola, Elisabetta 1988. Small random perturbations of dynamical systems: Exponential loss of memory of the initial condition. Communications in Mathematical Physics, Vol. 120, Issue. 1, p. 25.

Collet, Pierre 1988. Nonlinear Evolution and Chaotic Phenomena. Vol. 176, Issue. , p. 55.

Crauel, Hans 1990. Extremal exponents of random dynamical systems do not vanish. Journal of Dynamics and Differential Equations, Vol. 2, Issue. 3, p. 245.

Troubetzkoy, S. E. 1991. Stochastic stability of dispersing billiards. Theoretical and Mathematical Physics, Vol. 86, Issue. 2, p. 151.

Baxendale, Peter H. 1991. Spatial Stochastic Processes. p. 189.

Kifer, Yuri 1992. Mathematical Physics X. p. 334.

Baxendale, Peter H. 1992. Diffusion Processes and Related Problems in Analysis, Volume II. p. 3.

Malyshev, V. A. 1993. Networks and dynamical systems. Advances in Applied Probability, Vol. 25, Issue. 1, p. 140.

Young, L.-S. 1993. From Topology to Computation: Proceedings of the Smalefest. p. 201.

Liu, Z 1993. Random perturbations of the Feigenbaum map. Nonlinearity, Vol. 6, Issue. 6, p. 1037.

Malyshev, V. A. 1993. Networks and dynamical systems. Advances in Applied Probability, Vol. 25, Issue. 1, p. 140.

Mandell, Arnold J. and Selz, Karen A. 1993. Brain stem neuronal noise and neocortical ?resonance?. Journal of Statistical Physics, Vol. 70, Issue. 1-2, p. 355.

Molinek, D. K. 1994. Asymptotic measures for skew products of Bernoulli shifts with generalized north pole–south pole diffeomorphisms. Transactions of the American Mathematical Society, Vol. 345, Issue. 1, p. 263.

Diamond, Phil Kloeden, Peter and Pokrovskii, Alexei 1995. Analysis of an algorithm for computing invariant measures. Nonlinear Analysis: Theory, Methods & Applications, Vol. 24, Issue. 3, p. 323.

Nicol, Matthew 1996. Symmetries of the asymptotic dynamics of random compositions of equivariant maps. Nonlinearity, Vol. 9, Issue. 1, p. 225.

Ashwin, Peter and Stone, Emily 1997. Influence of noise near blowout bifurcation. Physical Review E, Vol. 56, Issue. 2, p. 1635.

Maes, C and Moffaert, A Van 1997. Stochastic stability of weakly coupled lattice maps. Nonlinearity, Vol. 10, Issue. 3, p. 715.

Collet, P. 1998. Probability Towards 2000. Vol. 128, Issue. , p. 137.

Bonatti, Christian and Viana, Marcelo 2000. SRB measures for partially hyperbolic systems whose central direction is mostly contracting. Israel Journal of Mathematics, Vol. 115, Issue. 1, p. 157.

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Stochastic stability of hyperbolic attractors

Abstract

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