MHD modeling of magnetotail instability for anisotropic pressure

Results of three-dimensional MHD simulations of magnetotail dynamics with anisotropic pressure are presented. The pressure tensor is assumed to be gyrotropic, satisfying a modified double adiabatic approximation including Ohmic heating. It is found that these constraints tend to stabilize the tail with respect to the resistive tearing instability. Including an increasing level of additional isotropization results in a gradual transition to the fast instability found in an isotropic model, which is discussed for comparison. Possible isotropization mechanisms yielding magnetotail instability are discussed also. The stabilizing anisotropies are found primarily in the plasma sheet boundary region. This fact indicates a possibly important role of isotropization mechanisms operating in this region in destabilizing the magnetotail and initiating a tearing instability without the necessity of changes in fluctuation levels in the neutral sheet.

[1]  V. Vasyliūnas Theoretical models of magnetic field line merging , 1975 .

[2]  T. Terasawa Numerical Study of Explosive Tearing Mode Instability in One-Component Plasmas , 1980 .

[3]  L. Frank,et al.  Observations pertaining to the dynamics of the plasma sheet. [in geomagnetic tail] , 1977 .

[4]  P. Pritchett,et al.  Plasma sheet convection and the stability of the magnetotail , 1990 .

[5]  J. Birn,et al.  Magnetic reconnection in the magnetotail current sheet for varying cross‐tail magnetic field , 1990 .

[6]  P. Palmadesso,et al.  Tearing instability in an anisotropic neutral sheet , 1983 .

[7]  J. Birn,et al.  Magnetosphere‐ionosphere coupling during plasmoid evolution: First results , 1991 .

[8]  Lou‐Chuang Lee,et al.  A study of tearing instability in the presence of a pressure anisotropy , 1987 .

[9]  F. Low,et al.  The Boltzmann equation an d the one-fluid hydromagnetic equations in the absence of particle collisions , 1956, Proceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences.

[10]  Lou‐Chuang Lee,et al.  Simulation of the collisionless tearing instability in an anisotropic neutral sheet , 1986 .

[11]  Michael Hesse,et al.  The substorm current wedge and field‐aligned currents in MHD simulations of magnetotail reconnection , 1991 .

[12]  P. Palmadesso,et al.  Chaos and nonlinear dynamics of single-particle orbits in a magnetotail-like magnetic field. Memorandum report , 1985 .

[13]  G. Siscoe Solar System Magnetohydrodynamics , 1983 .

[14]  T. Speiser,et al.  Evidence for current sheet acceleration in the geomagnetic tail , 1982 .

[15]  J. Birn,et al.  Three-dimensional MHD modeling of magnetotail dynamics for different polytropic indices , 1992 .

[16]  J. Birn Three-dimensional equilibria for the extended magnetotail and the generation of field-aligned current sheets , 1989 .

[17]  R. Kulsrud MHD description of plasma , 1983 .

[18]  S. Brecht,et al.  A simulation study of the Alfvén ion‐cyclotron instability in high‐beta plasmas , 1987 .

[19]  S. Cuperman Electromagnetic kinetic instabilities in multicomponent space plasmas: theoretical predictions and computer simulation experiments , 1981 .

[20]  E. W. Hones,et al.  ISEE 1 and 2 observations of ion distributions at the plasma sheet‐tail lobe boundary , 1988 .

[21]  G. S. Stiles,et al.  Plasma sheet pressure anisotropies , 1978 .

[22]  K. Roberts,et al.  Magnetohydrodynamic Equations for Finite Larmor Radius , 1962 .

[23]  J. Ogden,et al.  Electromagnetic ion cyclotron instability driven by ion energy anisotropy in high‐beta plasmas , 1975 .

[24]  W. Feldman,et al.  A second‐order theory for k∥B0 electromagnetic instabilities , 1978 .

[25]  Lev M. Zelenyi,et al.  Chaotization of the electron motion as the cause of an internal magnetotail instability and substorm onset , 1987 .

[26]  David L. Book,et al.  Flux-corrected transport II: Generalizations of the method , 1975 .

[27]  Harold P. Furth,et al.  Finite‐Resistivity Instabilities of a Sheet Pinch , 1963 .

[28]  S. Peter Gary,et al.  Proton temperature anisotropy instabilities in the solar wind , 1976 .

[29]  E. W. Hones,et al.  On the velocity distribution of ion jets during substorm recovery , 1981 .

[30]  N. Otani The alfve´n ion-cyclotron instability simulation theory and techniques , 1988 .