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Space physics EF2245 Tomas Karlsson Space and Plasma Physics School of Electrical Engineering EF2245 Space Physics 2009.

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Presentation on theme: "Space physics EF2245 Tomas Karlsson Space and Plasma Physics School of Electrical Engineering EF2245 Space Physics 2009."— Presentation transcript:

1 Space physics EF2245 Tomas Karlsson Space and Plasma Physics School of Electrical Engineering EF2245 Space Physics 2009

2 Space physics EF2245 EF2245 Space Physics 2009 Course goals After the course the student should be able to describe and explain basic processes in space plasma physics use established theories to estimate quantitatively the behaviour of some of these processes make simple analyses of various types of space physics data to compare with the quantitative theoretical predictions describe some hot topics of today’s space physics research Litterature Kivelson, M.G., and C. T. Russel (ed.), Introduction to Space Physics, Cambridge Univeristy Press.

3 Do you know MatLab? EF2245 Space Physics 2009

4  L + + + + + + + + + + + + + + + + + + + + + - - - - - - - - - - - - - - - - - - L x d EF2240 Space Physics 2009 Plasma frequency

5 Single particle motion EF2240 Space Physics 2009 Consider a charged particle in a magnetic field. y x B = B z z + Assume an electric field in the x-z plane: Constant acceleration along z

6 Drift motion EF2240 Space Physics 2009  Average over a gyro period: In general:

7 Drift motion F = 0 F = qE F = mg F = -  grad B EF2240 Space Physics 2009

8 Maxwell’s equations Gauss’ law No magnetic monopoles Faraday’s law Ampére’s law Lorentz’ force equation Ohm’s law j Energy density EF2245 Space Physics 2009

9 Frozen in magnetic flux PROOF II A B Order of magnitude estimate: Magnetic Reynolds number R m : R m >> 1  R m << 1  Frozen-in fields! Diffusion equation! EF2245 Space Physics 2009

10 This together with mass conservation, two of Maxwell’s equations and Ohm’s law make up the most common MHD equations: Magnetohydrodynamics (MHD) (1) (3) (4) Only consider slow variations (5) EF2245 Space Physics 2009 v (2)

11 Magnetohydrodynamics (MHD) (1) In equilibrium: Represents tension along B If magnetic tension = 0 Magnetic pressure EF2245 Space Physics 2009

12 Solar wind EF2245 Space Physics 2009 Solar corona

13

14 Solar wind properties EF2245 Space Physics 2009

15 Solar wind properties EF2245 Space Physics 2009

16 Solar wind properties 1.4∙10 -9 1.4∙10 -11 1.4∙10 -13 1.4∙10 -15 P interstellar  10 -13 – 10 -14 Pa EF2245 Space Physics 2009

17 Critical radius for realistic temperatures EF2245 Space Physics 2009

18 Solar wind solutions EF2245 Space Physics 2009

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