The onset of magnetoconvection at large Prandtl number in a rotating layer II. Small magnetic diffusion |
| |
| Authors: | C A Jones P H Roberts |
| |
| Institution: | 1. School of Mathematical Sciences, University of Exeter , Exeter, EX4 4QE, UK;2. School of Mathematical Sciences, University of Exeter , Exeter, EX4 4QE, UK;3. Department of Mathematics , University of California , Los Angeles, CA, 90095, USA |
| |
| Abstract: | Abstract This paper develops further a convection model that has been studied several times previously as a very crude idealization of planetary core dynamics. A plane layer of electrically-conducting fluid rotates about the vertical in the presence of a magnetic field. Such a field can be created spontaneously, as in the Childress-Soward dynamo, but here it is uniform, horizontal and externally-applied. The Prandtl number of the fluid is large, but the Ekman, Elsasser and Rayleigh numbers are of unit order. In Part I of this series, it was also supposed that the ratio thermal diffusivity diffusivity/magnetic diffusivity is O(1), but here we suppose that this ratio is large. The character of the solution is changed in this limit. In the case of main interest, when the layer is confined between electrically-insulating no-slip walls, the solution is significantly different from the solution when the mathematically simpler, illustrative boundary conditions also considered in Part I are employed. As in Part I, attention is focussed on the onset of convection as the temperature difference applied across the layer is increased, and on the preferred mode, i.e., the planform and time-dependence of small amplitude convection. |
| |
| Keywords: | Magnetohydrodynamics Rotating fluids Convection Dynamo theory Planetary magnetism |
|
|
