Anomalous diffusion and Lévy random walk of magnetic field lines in three dimensional turbulence

Zimbardo, G.; Veltri, P.; Basile, Giada; Principato, S.

doi:10.1063/1.871453

Cited by 115 publications

(74 citation statements)

References 35 publications

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“…can be computed as a function of the integration parameter ξ , and the diffusion coefficients are obtained from the transport law Zimbardo et al, 1995;Pommois et al, 1998Pommois et al, , 1999a, for more details on the numerical technique).…”

Section: Diffusion Coefficients In Local Anisotropic Turbulencementioning

confidence: 99%

A Monte Carlo simulation of magnetic field line tracing in the solar wind

Pommois

Zimbardo

Veltri

2001

Nonlin. Processes Geophys.

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Abstract.It is well known that the structure of magnetic field lines in solar wind can be influenced by the presence of the magnetohydrodynamic turbulence. We have developed a Monte Carlo simulation which traces the magnetic field lines in the heliosphere, including the effects of magnetic turbulence. These effects are modeled by random operators which are proportional to the square root of the magnetic field line diffusion coefficient. The modeling of the random terms is explained, in detail, in the case of numerical integration by discrete steps. Furthermore, a proper evaluation of the diffusion coefficient is obtained by a numerical simulation of transport in anisotropic magnetic turbulence. The scaling of the fluctuation level and of the correlation lengths with the distance from the Sun are also taken into account. As a consequence, plasma transport across the average magnetic field direction is obtained. An application to the propagation of energetic particles from corotating interacting regions to high heliographic latitudes is considered.

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Section: Diffusion Coefficients In Local Anisotropic Turbulencementioning

confidence: 99%

A Monte Carlo simulation of magnetic field line tracing in the solar wind

Pommois

Zimbardo

Veltri

2001

Nonlin. Processes Geophys.

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“…In a 3D equilibrium configuration, there can be regions where magnetic lines show a chaotic behavior: nearby magnetic lines can exponentially move apart with increasing distance along the lines (Zimbardo et al 1984(Zimbardo et al , 1995. Then, Alfvénic disturbances that locally follow magnetic lines are stretched exponentially in time, leading to a fast formation of small scales.…”

Section: Introductionmentioning

confidence: 99%

Alfvén wave dissipation and topological properties of 3D coronal force-free magnetic fields

Malara¹,

Veltri²,

Franceschis³

2007

A&A

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We study the propagation and dissipation of Alfvénic perturbation in a 3D equilibrium structure within a WKB model. We assume small amplitude and small wavelength of the perturbation. The generation of small scales in the perturbation is related to the property that nearby magnetic lines move apart from each other locally. This property is quantified by means of the Kolmogorov entropy H of magnetic lines. We numerically calculate the distribution of H for a 3D complex force-free equilibrium, which models the magnetic field above a quiet-Sun region, both for nonvanishing current and for a potential field. It is found that H decreases slightly with the altitude due to the decreasing complexity of the field, but it is relatively uniform except for the presence of sharp peaks, where H reaches much higher values than the average. These locations are those where Alfvén waves are preferentially dissipated. By analyzing the magnetic topology at these locations, we find that they correspond to separator lines which are intersections of separatrix surfaces. Then, in a high-Reynolds number plasma, such as in the solar corona, heating due to Alfvén wave dissipation takes place mainly at magnetic separatrices.

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“…The scaling 1/α law assigned to the Lévy flights has been empirically observed in laser cooling of atoms [3], in ion dynamics in optical lattice [4], in anomalous transport [5], in the measurement of the momentum of cold cesium atoms in a periodically pulsed standing wave of light [6]. The Lévy flights are widely used to model a variety of physical phenomena such as kinetics and transport in classical systems, anomalous diffusion, chaotic dynamics, plasma physics, dynamics of economic indexes, biology and physiology, social science (see for example, [1], [2] and references there).…”

Section: Introductionmentioning

confidence: 99%

Lévy flights over quantum paths

Laskin

2007

Communications in Nonlinear Science and Numerical Simulation

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An impact of integration over the paths of the Lévy flights on the quantum mechanical kernel has been studied. Analytical expression for a free particle kernel has been obtained in terms of the Fox Hfunction. A new equation for the kernel of a partical in the box has been found. New general results include the well known quantum formulae for a free particle kernel and particle in box kernel. PACS number(s): 03.65. 03.65. Db, 05.40. Fb

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Anomalous diffusion and Lévy random walk of magnetic field lines in three dimensional turbulence

Cited by 115 publications

References 35 publications

A Monte Carlo simulation of magnetic field line tracing in the solar wind

A Monte Carlo simulation of magnetic field line tracing in the solar wind

Alfvén wave dissipation and topological properties of 3D coronal force-free magnetic fields

Lévy flights over quantum paths

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