J. Büchner+collaborators, at different times, were:

Consequences of LHDI for three-dimensional collisionless reconnection through thin current sheets J. Büchner+collaborators, at different times, were: J. Kuska, B. Nikutowski, I.Silin, Th.Wiegelmann all at: Max-Planck Institut für Sonnensystem-forschung in Katlenburg-Lindau, Germany (for „Solar System Research“ starting 1.7.2004 after being „for Aeronomy“ the last 40 years) Cambridge, August 20, 2004

Topics Gradient and current-driven plasma instabilities in current sheets Initiation of 3D collisionless reconnection (PIC->Vlasov-simulation approach) in / through anti-parallel magnetic fields creation / annihilation of helicity density non-anti-parallel, finite guide magnetic field case asymmetric (magnetopause) current sheet case „Anomalous resistivity“ approach to introduce kinetic results into large scale MHD EUV Bright Points (BP): MHD modeling of the dynamic evolution (photospheric flows) + anomalous transport => Null point <or> finite B <or> QSL reconnection ??? Cambridge, August 20, 2004

3D current sheet instabilities 1970th: quasi/linear theory: LHD-instability at the edges (Drake, Huba, Davidson, Winske, Tanaka & Sato ... ) 1996: 3D PIC simulations showed: global (kink/sausage) mode current sheet instabilities can initiate reconnection (Pritchett et al.; Zhu & Winglee; Büchner & Kuska 1996) 1998...now: New theory - and simulation results about current-driven and drift instabilities at sheet center (Horiuchi & Sato; Büchner, Kuska & Silin; Daughton et al.) Our latest move: From PIC to Vlasov-codes to test wave-particle interactions, resonances etc. which can initiate current sheet instabilities and reconnection Cambridge, August 20, 2004

Kinetic stability investigation Vlasov equation: Linear perturbation of distribution functions Resulting perturbation of density and current Maxwell equations for the fields or wave equation for the potentials Cambridge, August 20, 2004

Linear stability of oblique eigenmodes at current sheet center -> > 20o: Eigenmodes are linearily stable(k=k0 cos ex +k0 sin ey) Cambridge, August 20, 2004

Vlasov simulation code Cambridge, August 20, 2004

Nonlinear LHDI (anti-parallel fields: Vlasov kinetic simulation) Cambridge, August 20, 2004

Non-local penetration of LHD unstable waves Cambridge, August 20, 2004

Simulation shows: the Ey fluctuations grow also at the center Cambridge, August 20, 2004

Drift-resonance instability (DRI) 1D ion distribution in the current direction 1D electron distribution in the current direction Ions drive waves → plateau-formation →electron-heating Cambridge, August 20, 2004

DRI: 3D distribution function 3D Ion distribution function 3D electron distribution Cambridge, August 20, 2004

3D current sheet instability (Plasma density perturbation; case of antiparallel fields) Cambridge, August 20, 2004

Current sheet thickness C1<->C4 (7.9.01, 19:00>23:00) Cambridge, August 20, 2004

Current sheet waves ~21:00 UT Cambridge, August 20, 2004

Current sheet waves –observed by Cluster as predicted Cambridge, August 20, 2004

Waves initiate 3D reconnection Cambridge, August 20, 2004

Mechanism:Wave- reconnection coupling: Dashed: LHDI (edge) ; Solid: LHDI at the center; Dashed-dotted: reconnecting mode Cambridge, August 20, 2004

3D reconnection island: Cambridge, August 20, 2004

2.) Helicity density evolution: a.) 3D antiparallel reconnection Spheres: quadrants 1 and 4 Squares: quadrants 2 and 3 Solid line - total helicity: Cambridge, August 20, 2004

Antiparallel -> finite guide field By guide field By -> flux ropes Quadrupolar By field -> Bending of B-fields Cambridge, August 20, 2004

Finite guide field case -> non 180o magnetic shear Positive Co-helicity HMo > 0 Guide fields change the shear angle between the ambient B-fields 180o Negative Co-helicity HMo < 0 (J = direction of sheet current and of reconnection E- field) Cambridge, August 20, 2004

3D guide field reconnection: initially positive co-helicity case t = 1 t = 25 Cambridge, August 20, 2004

2D / 3D positive co-helicity reconnection („pull reconnection“) Dotted: quadrants 1 and 4 Dashed: quadrants 2 and 3 Solid line - total helicity: Cambridge, August 20, 2004

3D guide field reconnection: initially negative co-helicity case t = 1 t = 23 Cambridge, August 20, 2004

2D / 3D negative co-helicity reconnection („push reconnection“) Dotted: quadrants 1 and 4 Dashed: quadrants 2 and 3 Solid line - total helicity: Cambridge, August 20, 2004

3.) Resonant DRI in the guide field case: For stronger guide fields the cross-field propagation direction turns further away from the current direction. The growth rate of the instability decreases proportionally to the number of resonant ions. Cambridge, August 20, 2004

Reconnection wave in a non- anti-parallel (guide field) current sheet Bz in log presentation turbulence -> structure Bz in linear presentation for the polarity of magnetic bubbles Cambridge, August 20, 2004

Result: patchy reconnection in the non-anti-parallel, guide field case: The B field opens the boundary throug local patches (blue: below, red: above) Cambridge, August 20, 2004

4: Non-symmetric case (MP) Simulation model The pressure being locally balanced; drift Maxwellians, drifts currents -> fields rotate through a tangential magnetic boundary Cambridge, August 20, 2004

Instability of a non-symmetric magnetic boundary current sheet Magnetic field Bz: LHD instability first on magnetospheric side (z<0) -> penetrates to the magnetosheath side (z>0) and triggers reconnection - island formation Cambridge, August 20, 2004

Magnetopause observation (Cluster) A. Vaivads et al., 2004 Cambridge, August 20, 2004

5.) Quasilinear estimate of the WP momentum exchange (-> “anomalous collision frequency;-> “... resistivity”) (Davidson and Gladd, Phys. Fluids, 1975) Cambridge, August 20, 2004

Anomalous momentum exchangedue to nonlinear DRI in a current sheet: Cambridge, August 20, 2004

6.) X-ray & EUV Bright Points (BPs): quiet-sun reconnection XBP are formed inside diffuse clouds, which grow at 1 km/s up to 20 Mm and then form a bright core 3 Mm wide, they last, typically, 8 h Vaiana, 1970: rockets; Golub et al. 1974-77: Skylab More recently: SOHO and TRACE observations -Later (Soho...) : also many EUV BP investigated > BP are assumed to be prime candidates for reconnection: they well correlate with separated photospheric dipolar (opposite polarity) photospheric magnetic fluxes Cambridge, August 20, 2004

Soho-MDI and EIT: EUV BP 17-18.10.1996 (M. Madjarska et al., 2003) MDI line-of sight magnetic field ( 40” x 40”) EIT (195 A) same field of view Cambridge, August 20, 2004

Reconnection models for BP Due to the B separation in the photosphere -> Reconnection between bipoles assumed to take place in the corona, -> magnetohydrostatic models, e.g. Newly Emerging Flux Model (EMF) Heyvaerts, Priest & Rust 1977 Converging flux model Priest, Parnell, Martin & Gollup, 1994 Separator Reconnection in MCC Longcope, 1998 Cambridge, August 20, 2004

But: dynamical footpoint motion: -> currents are driven into the chromosphere/corona Cambridge, August 20, 2004

Model, starting with extrapolated B-fields ... Cambridge, August 20, 2004

... and footpoint motion (here after 1:39 ...and density-heightUT 18.10.96): profile (VAL): Cambridge, August 20, 2004

Density Evolution -> t=128 Cambridge, August 20, 2004

Parallel electric fields and parallel currents at t=128 Cambridge, August 20, 2004

Transition region parallel electric fields Cambridge, August 20, 2004

Transition region reconnection Cambridge, August 20, 2004

Reconnection due to resistivity switched on enhanced current (velocity) Cambridge, August 20, 2004

Not at a null, but between two nulls (separator through 35,20,5 ?) <- Iso- surfaces of a small total magnetic field, hence embedding the nulls Cambridge, August 20, 2004

Further work planned on: • Current sheet instabilities for more realistic current and field models and their consequences for reconnection • resulting anomalous transport as an approach toward quantifying the coupling between MHD and kinetic scales for solar and magnetospheric applications • Reconnection at neutral points vs. separator reconnection vs. quasi-separatrix layer - reconnection in the course of the dynamically evolving „magnetic carpet“ („tectonics“) Cambridge, August 20, 2004

J. Büchner+collaborators, at different times, were:

J. Büchner+collaborators, at different times, were:

Presentation Transcript

Collaborators

Collaborators

B&J

J N B

Collaborators

b uilt different.

What were the different cliques?

Collaborators

At times ...

By: J. B.

J O B

J N B

Collaborators:

Collaborators:

Collaborators

Collaborators

j b nonbrand

Collaborators

COLLABORATORS

Collaborators

Different Times, Different Thinking

Collaborators: