ergodic - définition. Qu'est-ce que ergodic
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Qu'est-ce (qui) est ergodic - définition

PROPERTY OF A DYNAMICAL SYSTEM
Ergodic; Nonergodic; Ergodic measure; Ergodic (adjective); Ergotic; Uniquely ergodic; Unique ergodicity; Absorbing barrier (finance)

ergodic         
[?:'g?d?k]
¦ adjective Mathematics denoting systems or processes which, given sufficient time, include or impinge on all points in a given space.
Derivatives
ergodicity noun
Origin
early 20th cent.: from Ger. ergoden, from Gk ergon 'work' + hodos 'way' + -ic.
Ergodicity         
In mathematics, ergodicity expresses the idea that a point of a moving system, either a dynamical system or a stochastic process, will eventually visit all parts of the space that the system moves in, in a uniform and random sense. This implies that the average behavior of the system can be deduced from the trajectory of a "typical" point.
Ergodic theory         
  • Evolution of an ensemble of classical systems in phase space (top). The systems are massive particles in a one-dimensional potential well (red curve, lower figure). The initially compact ensemble becomes swirled up over time and "spread around" phase space. This is however ''not'' ergodic behaviour since the systems do not visit the left-hand potential well.
BRANCH OF MATHEMATICS THAT STUDIES DYNAMICAL SYSTEMS
Ergodic theorem; Metric transitivity; Ergodic system; Occurence time; Sojourn time; Birkhoff-Khinchin ergodic theorem; Birkhoff's ergodic theorem; Birkhoff ergodic theorem; Ergodic transformation; Ergodic systems; Weakly ergodic; Ergodic properties; Ergodic theorems; Ergodic set; Strongly ergodic; Birkhoff–Khinchin theorem; Birkhoff-Khinchin theorem; Birkhoff–Khinchin ergodic theorem; Mean ergodic theorem; Ergodic Theory; Individual ergodic theorem; Birkhoff's Ergodic Theorem; Von Neumann's ergodic theorem; Von Neumann's mean ergodic theorem; Von Neumann mean ergodic theorem; Von Neumann ergodic theorem; Occurrence time
Ergodic theory (Greek: "work", "way") is a branch of mathematics that studies statistical properties of deterministic dynamical systems; it is the study of ergodicity. In this context, statistical properties means properties which are expressed through the behavior of time averages of various functions along trajectories of dynamical systems.

Wikipédia

Ergodicity

In mathematics, ergodicity expresses the idea that a point of a moving system, either a dynamical system or a stochastic process, will eventually visit all parts of the space that the system moves in, in a uniform and random sense. This implies that the average behavior of the system can be deduced from the trajectory of a "typical" point. Equivalently, a sufficiently large collection of random samples from a process can represent the average statistical properties of the entire process. Ergodicity is a property of the system; it is a statement that the system cannot be reduced or factored into smaller components. Ergodic theory is the study of systems possessing ergodicity.

Ergodic systems occur in a broad range of systems in physics and in geometry. This can be roughly understood to be due to a common phenomenon: the motion of particles, that is, geodesics on a hyperbolic manifold are divergent; when that manifold is compact, that is, of finite size, those orbits return to the same general area, eventually filling the entire space.

Ergodic systems capture the common-sense, every-day notions of randomness, such that smoke might come to fill all of a smoke-filled room, or that a block of metal might eventually come to have the same temperature throughout, or that flips of a fair coin may come up heads and tails half the time. A stronger concept than ergodicity is that of mixing, which aims to mathematically describe the common-sense notions of mixing, such as mixing drinks or mixing cooking ingredients.

The proper mathematical formulation of ergodicity is founded on the formal definitions of measure theory and dynamical systems, and rather specifically on the notion of a measure-preserving dynamical system. The origins of ergodicity lie in statistical physics, where Ludwig Boltzmann formulated the ergodic hypothesis.

Exemples du corpus de texte pour ergodic
1. Oren is an interesting character, having received a Ph.D. from Stanford at age 21 in mathematics, in the field of dynamic systems and Ergodic theory.