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Kinetic Structure of the Reconnection Layer and of Slow Mode Shocks

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1 Kinetic Structure of the Reconnection Layer and of Slow Mode Shocks
Manfred Scholer Centre for Interdisciplinary Plasma Science Max-Planck-Institut für extraterrestrische Physik, Garching, Germany Kaspar Arzner Michael Cremer Irina Sidorenko Isaac Newton Institute, August 2004

2 Onset of collisionless reconnection in thin current sheets:
First a few vgiewgraphs about Onset of collisionless reconnection in thin current sheets: Anti-parallel and sheared magnetic fields (3-D PIC simulations) Scholer, Sidorenko, Jaroschek, Treumann, 2003

3 Initial Equilibrium and Numerical Set-up
Double Harris-sheet Current sheet width = 1 ion inertial length Periodicity in all three directions particles of each species (note the coordinate system: z is the current direction)

4 I. Thin Current Sheet with Antiparallel Magnetic Field
Right: Reconnected flux versus time. The whole flux between the two current sheets is reconnected when Left: Magnetic field pattern at four different times (Isointensity contours of )

5 Lower Hybrid Drift Instability at the
Current Sheet Edge Color coded electron density (left) and electric field (right) in the current directionin the plane perpendicular to the magnetic field.

6 Cuts of various parameters before reconnection starts
Cuts of electron contribution to current density (top) and electron density across the current sheet. Profiles at t=0 are shown dashed for reference. Reduced electron distribution function f(v_z) versus v_z in the current sheet gradient region (top) and in the center (bottom) of the current sheet exhibiting electron acceleration in the electric field of the LHD waves.

7 Development of the Reconnection Line
Reconnecrtion channel Shown is the normal magnetic field component in the center of the current sheet (blue: negative field, red: positive field). Transitions from red to blue indicate positions of a neutral line. Initially, several single neutral lines emerge. Eventually one single reconnection channel results. Two reconnection channels

8 Development of Neutral Line (Guide Field Case Bz=1)
With a sufficiently strong guide field reconnection is two-dimensional, i.e., a single X line develops and extends through the whole system Time for electrons to move across the system smaller than growth time of instability

9 Guide Field = 20% of Main Field
Deviation of main field above (right) and below (left) current sheet at wo different times LH waves propagate perpendicular to the Magnetic field In this guide field case the LHDI develops as well. After reconnection onset the reconnection rate is about the same as in the exactly antiparallel case.

10 Development of the Reconnection Channels
Guide field = 0.2 of main field

11 ‘Antiparallel reconnection‘
‘Component reconnection‘

12 Reconnection Layer Collisionless MHD Petschek, 1964 Hill, 1975
2 switch-off shocks bound the reconnection layer Hill, 1975 Current sheet where particles Perform Speiser-type orbits

13 Investigation of the reconnection layer by large-scale hybrid
simulations Analysis of slow mode shocks by solving an equivalent Riemann problem (decay of a current sheet)

14 2-D hybrid simulation of tail reconnection
Hybrid code with massless electrons Initial equilibrium is Birn et al. (1975) equilibrium with flaring tail (but can also be a Harris sheet) Simulation box of 500 x 126 ion inertial lengths (lO=c/wpi , where plasma frequency refers to current sheet center density) (corresponds to about 100 x 25 RE) Lobe density to center density at x=0 is 0.4 Temperature is chosen such that overall prssure balance is maintained (bi=be=0.05 in the lobe) Reconnection is initialized by localized resistivity at 100 lO Computed up to 500 Wci-1 We are back to the magnetospheric coordinare system

15

16 By – field (out-of-plane)
y-component of ion vorticity is frozen into ion fluid u. In the inflow lobe region both terms are zero. Occurrence of vorticity has to be cancelled by By

17 1.Near diffusion region:
interpenetrating cold beams 2.Center of current sheet: Partial ring distribution due to Speiser-type orbitsin CS with thickness larger than ion gyroradius 3.Boundary layer: Speiser accelerated ions ejected onto reconnected field lines 4.Post-plasmoid plasma sheet: Hot thermalized distribution 1.,2.,3. closely resembles Hill (1975) scenario

18 Instability and breakup of current sheet
Waves are standing in the outflow frame

19 Instability and breakup of the current sheet
Bulk velocity shear insufficient to drive KH instability. Beams in the BL provide additional energy to drive instabiliy. Due to sharp gradients in BL a homogeneous scenario does not apply. 3-layer anisotropic MHD model. Free energy mainly produced by velocity anisotropy; bulk velocity shear plays auxiliary role

20 Comparison of solution of dispersion relation with simulation
Arzner and Scholer, 2001 Simulation: Dominant wavelength l = 20 lO, corresponding to k = 0.3; wavelength increases with x. Phase velocity and group velocity about equal to outflow velocity. 3-layer model (red) compares favorably with simulation.

21 Development of the instability with distance
monochromatic higher harmonics cascading to lower wavelengths

22 Simulated power spectra of B time series averaged over the turbulent
range in the post plasmoid plasma sheet. Agrees with observed temporal power spectra in the tail (AMPTE: Bauer et al., 1995; GEOTAIL: Hoshino et al., 1994).

23 Hot thermalized post-plasmoid
plasma sheet Boundary layer Lobe distribution

24 Dissipation Mechanism in Slow Mode Shocks
Bounding the Reconnection Layer Cremer and Scholer, 2000

25 Solution of an Equivalent Riemann Problem
(Decay of a 1D current sheet wit normal magnetic field)

26 Ion distribution function
Perpendicular Heating of Lobe by the EMIIC Instability Ion distribution function In the LOBE! Temperature in lobe vs time

27 Nonresonant and right-hand resonant
ion-ion beam instabilities are stable. Oblique propagating AIC waves are excited by the EMIIC instability. They heat lobe and beam ions perpendicular to the magnetic field. Large perpendicular to parallel temperature anisotropy excites parallel propagating AIC waves. These AIC waves lead downstream to ion phase-mixing and thermalization.

28 Excitation of parallel propagating AIC waves by the perp to parallel
temperature anisotropy W-kx power spectrum and result from linear theory; hodogram of kx=1 mode 2D Fourier analysis in the kx-kz plane

29 Suggested cycle of processes leading to slow mode shocks bounding
the reconnection layer


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