David Ruelle scite author profile

Physical and numerical experiments show that deterministic noise, or chaos, is ubiquitous. While a good understanding of the onset of chaos has been achieved, using as a mathematical tool the geometric theory of differentiable'dynamical systems, moderately excited chaotic systems require new tools, which are provided by the ergodic theory of dynamical systems. This theory has reached a stage where fruitful contact and exchange with physical experiments has become widespread. The present review is an account of the main mathematical ideas and, their concrete implementation in analyzing experiments. The main subjects are the theory of dimensions (number of excited degrees of freedom), entropy (production of information), and characteristic exponents (describing sensitivity to initial conditions). The relations between these quantities, as well as their experimental determination, are discussed. The systematic investigation of these quantities provides us for the first time with a reasonable understanding of dynamical systems, excited well beyond the quasiperiodic regimes. This is another step towards understanding highly turbulent fluids.

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Recurrence Plots of Dynamical Systems

Eckmann

1995

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Statistical Mechanics

Ruelle

1999

809

979

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Recurrence Plots of Dynamical Systems

1987

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Ergodic theory of chaos and strange attractors

1985

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David Ruelle

Ergodic theory of chaos and strange attractors

Recurrence Plots of Dynamical Systems

Statistical Mechanics

Recurrence Plots of Dynamical Systems

Ergodic theory of chaos and strange attractors

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