Dynamo Action in the Presence of an Imposed Magnetic Field

Abstract

We consider the linear stability to three-dimensional perturbations of two-dimensional nonlinear magnetohydrodynamic basic states obtained from a specified forcing function in the presence of an imposed initially uniform magnetic field of strength B0. The forcing is chosen such that it drives the CP flow of Galloway & Proctor (1992) when B0=0. We first examine the properties of these basic states and their dependence on B0 and on the magnetic Reynolds number Rm. The linear stability of these states is then investigated. It is found that at a given Rm the presence of a background field is stabilising. The results also allow us to speculate that at a fixed value of B0 the growth of the unstable perturbations is `fast', in the sense that the growth rate becomes independent of Rm as Rm ∞.