- Lévy flight
A Lévy flight, named after the French mathematician
Paul Pierre Lévy , is a type ofrandom walk in which the increments are distributed according to a "heavy-tailed" distribution.A heavy-tailed distribution is a
probability distribution which falls to zero as 1/|"x"|α+1 where 0 < α < 2 and therefore has an infinitevariance . According to thecentral limit theorem , if the distribution were to have a finite variance, then after a large number of steps, the distance from the origin of the random walk would tend to anormal distribution . In contrast, if the distribution is heavy-tailed, then after a large number of steps, the distance from the origin of the random walk will tend to a Lévy distribution. Lévy flight is part of a class of Markov processes.Two-dimensional Lévy flights were described by
Benoît Mandelbrot in "The Fractal Geometry of Nature". The exponential scaling of the step lengths gives Lévy flights a scale invariant property, and they are used to model data that exhibits clustering.This method of simulation stems heavily from the mathematics related to
chaos theory and is useful in stochastic measurement and simulations for random or pseudo-random natural phenomena. Examples includeearthquake data analysis,financial mathematics ,cryptography , signals analysis as well as many applications inastronomy andbiology .ee also
*
Monte Carlo method
*Pseudo-random number
*Chaos theory
*Random walk
*Fourier transform
*Crystallography
*Geology
*Astronomy
*Fat tail
*Lévy process External links
* [http://plus.maths.org/issue11/features/physics_world/ A comparison of the paintings of Jackson Pollock to a Lévy flight model]
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