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Green's functions of the induction equation on regions with boundary. II. Spherical regions
Author(s) -
Bräuer H.J.,
Rädler K.H.
Publication year - 1987
Publication title -
astronomische nachrichten
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.394
H-Index - 63
eISSN - 1521-3994
pISSN - 0004-6337
DOI - 10.1002/asna.2113080105
Subject(s) - physics , angular velocity , rotation (mathematics) , differential rotation , boundary value problem , radius , classical mechanics , green s , mathematical analysis , differential equation , function (biology) , magnetic field , mechanics , geometry , mathematics , quantum mechanics , computer security , evolutionary biology , computer science , biology
In an earlier paper the evolution of a magnetic field was considered which permeates an electrically conducting fluid and its non‐conducting surroundings. It was shown how the tensorial Green's function of the initial value problem posed by the governing equations can be constructed. The present paper gives a more detailed analysis of the case where the fluid occupies the interior of a sphere. The construction is carried out for arbitrary motions of the fluid. More special results are derived for differential rotation with angular velocity depending only on the radius, and explicit expressions of Green's functions are given for rigid body rotation.