Earth, Planets and Space

, Volume 52, Issue 7, pp 503–507 | Cite as

A wave equation describing the generation of field-aligned current in the magnetosphere

  • Masahiro Itonaga
  • Akimasa Yoshikawa
  • Shigeru Fujita
Open Access


A wave equation describing the generation of field-aligned current (FAC) in the magnetosphere is derived. The equation has four source terms. The first and second terms represent the effects of inhomogeneous Alfvén speed (VA) and curvilinear magnetic field line, respectively. The perpendicular perturbation inertial current produces the perturbation FAC via these effects. Around the magnetic equator in the region of dipolar magnetic field where VA is inversely proportional to the power of the radial distance from the Earth’s center, the first and second terms have magnitudes of the same order and their signs are identical. The first term dominates over the second one around the region where the gradient of VA is sharp and vice versa around the position where the stretched field line intersects the magnetic equator. The third and fourth terms are related to the diamagnetic current. When the unperturbed magnetic pressure has an inhomogeneous distribution, the perpendicular diamagnetic current due to the perturbation of the plasma pressure yields the perturbation FAC (third term). When the perpendicular diamagnetic current flows in the unperturbed state, the perturbations of the magnetic and plasma pressures also bring about the perturbation FAC (fourth term). In the case of β ∼ 1, the third and fourth terms have magnitudes of the same order. If the disturbance bears a diamagnetic property, this would be especially the case. However, if the disturbance propagates perpendicularly to the ambient magnetic field, the perturbation FAC would be little generated by the fourth term.


Plasma Pressure Fourth Term Magnetic Equator Magnetosonic Wave Unperturbed State 
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Copyright information

© The Society of Geomagnetism and Earth, Planetary and Space Sciences (SGEPSS); The Seismological Society of Japan; The Volcanological Society of Japan; The Geodetic Society of Japan; The Japanese Society for Planetary Sciences. 2000

Authors and Affiliations

  • Masahiro Itonaga
    • 1
  • Akimasa Yoshikawa
    • 2
  • Shigeru Fujita
    • 3
    • 4
  1. 1.Faculty of EducationYamaguchi UniversityYamaguchiJapan
  2. 2.Department of Earth and Planetary SciencesKyushu UniversityFukuokaJapan
  3. 3.Meteorological CollegeKashiwaJapan
  4. 4.Department of GeophysicsKyoto UniversityKyotoJapan

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