Magnetospheric Charged Fluid Transport - PowerPoint PPT Presentation

About This Presentation
Title:

Magnetospheric Charged Fluid Transport

Description:

Magnetospheric Charged Fluid Transport Robert Sheldon University of Alabama in Huntsville September 22, 1999 – PowerPoint PPT presentation

Number of Views:71
Avg rating:3.0/5.0
Slides: 17
Provided by: Elij48
Category:

less

Transcript and Presenter's Notes

Title: Magnetospheric Charged Fluid Transport


1
Magnetospheric Charged Fluid Transport
  • Robert Sheldon
  • University of Alabama in Huntsville
  • September 22, 1999

2
History of Diffusive Transport
Thanks Barry, Dick Haje
  • Early 1960s, radiation belt theory was
    developed, first analytically, then with fluid
    PDEs.
  • By 1970s, ring current theory followed rad
    belts. Analytic theory was not able to describe
    the data. Fluid models dominated.
  • 1980s, saw increasing use of particle tracing
    and Monte-Carlo solutions.
  • 90s developed hybrid models e.g. w/MHD

3
Whats wrong with this picture?
  • In the 30 years since these early models,
    computers have increased in speed by 215,
    according to Moores law.
  • This should have produced models that are perhaps
    32,000 times better, but the deviations (model
    - data)/data have barely improved a factor 2.
    Err100 is still considered good agreement.
  • Why has the convergence been so slow?

4
Degrees of Freedom
  • Phase space is 6-Dimensional. This is the maximum
    of degrees of freedom.
  • Adiabatic invariants involve an average over one
    of these dimensions.
  • Time is NOT a degree of freedom. For one thing,
    diffusion in all 6 phase space dimensions is
    possible. Time does not diffuse. In PDEs it
    introduces a parabolic dimension, d/dt d2/dq2.
    One can always add a homogeneous solution, 0
    d2/dq2

5
An Aside on MHD
  • MHD includes 2 more vector fields with the phase
    space density This 12-D field gets simplified
    down to 5-D using coupling equations.
    Unfortunately, the phase space is averaged into
    moments, and therefore not applicable for inner
    magnetosphere.
  • We assume both E and B model and keep as much
    information in phase space.

6
Non-MHD Inner Msphere bltlt1 6-D 5-D
4-D 3D
  • Particle tracing
  • Vx,Vy,Vz, X,Y,Z
  • m, J, L, Fm,FJ,FL
  • m,J, L,Fm, FJ,FL,t
  • Vx,Vy,Vz, X,Y,Z,t
  • Gyro-kinetic
  • m, J, L, FJ, FL
  • m, J, L, FJ, FL,t
  • Radial diffusion
  • B-L space
  • m, J, L
  • m, J, L, t
  • Salammbo
  • Guiding center
  • m,J,L,FL
  • m,U,B,K
  • m,U,B,K,t

Dynamic, time-dependent models
7
1-D Diffusion Modelling
  • Analytic Solution
  • Errorgt0
  • 6-Dimensional No effect.
  • Fluid PDE
  • df/dt D d2f/d2x
  • Error gt dx
  • 6-Dimensional
  • (X/dx)1/6
  • Particle tracing Monte-Carlo
  • Error gt dx/X dN1/2
  • 6-Dimensional (X/dx)1/6(N1/12)

215 gt(215)1/12 2.37!
8
Lessons from Numerics
  • 1) Use as low a dimension as possible. As simple
    as possible, but no simpler.
  • 2) Use as analytic a technique as possible.
  • Example Radiation Belt Models.
  • 3-D, averaging over Fm,FJ,FL
  • symmetry in B, allows L radial distance,
  • thus diffusion in L is separable from convection
  • Extension to Ring Current Belt Models?
  • NOT SYMMETRIC! Drift shell splitting, ...
  • NOT SEPARABLE!

9
2-Diffusive Transport
  • If coordinates are not separable, gtnew physics
  • Vortices, convection
  • Anomalous, or enhanced diffusion, migration
  • Convection diffusion confusion
  • If coordinates are separable, then D D1 D2
    gt diagonally dominant, easily generalized from
    1-D.
  • DLL, Daa, Dmm gt radial diffusion models (Schulz
    74)

Is there a coordinate system which is separable?
10
Yes! UBK (Whipple, 78)
  • Average over Fm,FJ gt 1st 2nd adiabatic
    invariants. Then the total energy is
  • H0 K.E. P.E.
  • H0 mBm(x,y) q U(x,y)
  • dH0/dt 0 mdBm/dt q dU/dt
  • dU/dBm -m/q
  • Convection conserves energy, so constant energy
    trajectories convection. In UB space these are
    straight lines. Coordinates SEPARATE! (Sheldon
    Gaffey, 95)

11
Schematic UBK
U
dawn
e-
i
Magnetotail
D
(2)
(1)
Earth
dusk
(3)
Bm(K)
12
2 ways to diffusion convection
Hamiltonian Lagrangian
  • (Stern 78, Northrop 63)
  • Time is implicit
  • Energy explicit
  • Lie groups perturbation theory, high-order
    accuracy is built-in. (Design of the SSC magnets
    used some 15 orders to achieve 106 orbits.
    Dragts book.)
  • (Chen 70, Smith 74)
  • Time is explicit
  • Energy implicit
  • ODE solvers, Runge-Kutta 4/5, high-order accuracy
    hard to achieve (Gears Implicit methods,
    Adams-Bashford-Moultons predictor-corrector,
    Bulirsch-Stoers extrapolation)

13
Hamiltonian Diffusion
  • HH0 H1 H2
  • H mBm qU mdBm/dt q dU/dt
  • ltHgt 0 (conservation of energy)
  • ltH2gt / 0 gt D a m(dBm/dt)2 q (dU/dt)2
  • Diffusion coefficient is easily derived (cf.
    Falthammer 65,68, Lyons 75)
  • Asymptotic series converge rapidly, error is
    minimized. (cf. Dragt 9x and Lie algebra)
  • Explains the L4 dependence seen in the data.

(Sheldon, 97)
14
Uncontrolled Exuberance
  • We now have the tools to analyze thermal to
    radiation belt plasmas (0ltEltMeV) with radial
    diffusion models
  • Diffusion coefficient D(U,B,K,m)D(x,y,K,m)
  • Convection coefficient v(U,B,K,m)
  • Coulomb drag coefficient C(U,B,K,m)
  • Charge exchange rate X(U,B,K,m)
  • df/dt d/dq(Dqq df/dq) vq df/dq C df/dm Xf

15
Conclusions
  • UBK is a 4-D method, the simplest system able to
    describe magnetospheric convection
  • UBK then is ideal for inner mag plasma at 0
    lt E lt MeV conserving the first 2 invariants
  • UBK straightens trajectories, helping intuition
  • UBK has separable coordinates for diffusion and
    convection avoiding confusion.
  • UBK permits a Hamiltonian perturbation expansion
    gt trivial calculation of diffusion
  • Applications Jupiter. Heliosphere. Cusp!

16
Examples
  • Separatrix between plasmasphere bananasphere
    explains Williams Frank 84,88. mystery peak.
    (Sheldon 94)
  • This peak explains fast diffusive transport
    (Sheldon 91) and RC storm injection (Sheldon 99)
  • Separatrix between plasmasphere and open drift
    explains LANL signatures (Sylvestre, Korth) and
    determines E-field (McIlwain).
  • Matching particle features between ISTP
    spacecraft determines E-field (Whipple 98)
Write a Comment
User Comments (0)
About PowerShow.com