Mathematics – Probability
Scientific paper
Sep 2007
adsabs.harvard.edu/cgi-bin/nph-data_query?bibcode=2007aipc..934..144p&link_type=abstract
FLOWS, BOUNDARIES, INTERACTIONS: Flows, Boundaries, and Interaction Workshop. AIP Conference Proceedings, Volume 934, pp. 144-1
Mathematics
Probability
Numerical Approximation And Analysis, Interactions With Solar Wind Plasma And Fields, Partial Differential Equations
Scientific paper
This paper presents a method for an explicit analysis of the equations with fractional derivatives that describe important physical processes in solar wind plasmas, in plasmas of thermonuclear devices, etc. Space-time fractional diffusions account for anomalous features, which are observed in such physical processes. In certain cases the fundamental solutions of these equations can be interpreted as probability density functions. Thus, we observe that anomalous diffusion equations are related to Levy stable non-Gaussian processes. An example is the multiscale nature of the magnetosphere, where the correlated data of the solar wind-magnetosphere system show that probability distribution function is non-Gaussian.
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