1,955 research outputs found
Three-dimensional analytical magnetohydrostatic equilibria of rigidly rotating magnetospheres in cylindrical geometry
We present three-dimensional solutions of the magnetohydrostatic equations in
the co-rotating frame of reference outside a magnetized rigidly rotating
cylinder. We make no symmetry assumption for the magnetic field, but to be able
to make analytical progress we neglect outflows and specify a particular form
for the current density. The magnetohydrostatic equations can then be reduced
to a single linear partial differential equation for a pseudo-potential ,
from which the magnetic field can be calculated by differentiation. The
equation for can be solved by standard methods. The solutions can also be
used to determine the plasma pressure, density and temperature as functions of
all three spatial coordinates. Despite the obvious limitations of this
approach, it can for example be used as a simple tool to create
three-dimensional models for the closed field line regions of rotating
magnetospheres without rotational symmetry.Comment: 13 pages, 2 figures, accepted for publication by Geophysical and
Astrophysical Fluid Dynamic
On the Relationship between Equilibrium Bifurcations and Ideal MHD Instabilities for Line-Tied Coronal Loops
For axisymmetric models for coronal loops the relationship between the
bifurcation points of magnetohydrodynamic (MHD) equilibrium sequences and the
points of linear ideal MHD instability is investigated imposing line-tied
boundary conditions. Using a well-studied example based on the Gold-Hoyle
equilibrium, it is demonstrated that if the equilibrium sequence is calculated
using the Grad-Shafranov equation, the instability corresponds to the second
bifurcation point and not the first bifurcation point because the equilibrium
boundary conditions allow for modes which are excluded from the linear ideal
stability analysis. This is shown by calculating the bifurcating equilibrium
branches and comparing the spatial structure of the solutions close to the
bifurcation point with the spatial structure of the unstable mode. If the
equilibrium sequence is calculated using Euler potentials the first bifurcation
point of the Grad-Shafranov case is not found, and the first bifurcation point
of the Euler potential description coincides with the ideal instability
threshold. An explanation of this results in terms of linear bifurcation theory
is given and the implications for the use of MHD equilibrium bifurcations to
explain eruptive phenomena is briefly discussed.Comment: 22 pages, 6 figures, accepted by Solar Physic
Collisionless distribution function for the relativistic force-free Harris sheet
A self-consistent collisionless distribution function for the relativistic analogue of the force-free Harris sheet is presented. This distribution function is the relativistic generalization of the distribution function for the non-relativistic collisionless force-free Harris sheet recently found by Harrison and Neukirch [Phys. Rev. Lett. 102, 135003 (2009)], as it has the same dependence on the particle energy and canonical momenta. We present a detailed calculation which shows that the proposed distribution function generates the required current density profile (and thus magnetic field profile) in a frame of reference in which the electric potential vanishes identically. The connection between the parameters of the distribution function and the macroscopic parameters such as the current sheet thickness is discussed. (C) 2012 American Institute of Physics. [doi: 10.1063/1.3677268]PostprintPeer reviewe
Particle energisation in a collapsing magnetic trap model : the relativistic regime
The authors acknowledge financial support by the UK’s Science and Technology Facilities Council through a Doctoral Training Grant (SEO) and Consolidated Grant ST/K000950/1 (SEO and TN).Context. In solar flares, a large number of charged particles is accelerated to high energies. By which physical processes this is achieved is one of the main open problems in solar physics. It has been suggested that during a flare, regions of the rapidly relaxing magnetic field can form a collapsing magnetic trap (CMT) and that this trap may contribute to particle energisation. Aims. In this Research Note we focus on a particular analytical CMT model based on kinematic magnetohydrodynamics. Previous investigations of particle acceleration for this CMT model focused on the non-relativistic energy regime. It is the specific aim of this Research Note to extend the previous work to relativistic particle energies. Methods. Particle orbits were calculated numerically using the relativistic guiding centre equations. We also calculated particle orbits using the non-relativistic guiding centre equations for comparison. Results. For mildly relativistic energies the relativistic and non-relativistic particle orbits mainly agree well, but clear deviations are seen for higher energies. In particular, the final particle energies obtained from the relativistic calculations are systematically lower than the energies reached from the corresponding non-relativistic calculations, and the mirror points of the relativistic orbits are systematically higher than for the corresponding non-relativistic orbits. Conclusions. While the overall behaviour of particle orbits in CMTs does not differ qualitatively when using the relativistic guiding centre equations, there are a few systematic quantitative differences between relativistic and non-relativistic particle dynamics.Publisher PDFPeer reviewe
Writhe formulas and antipodal points in plectonemic DNA configurations
The linking and writhing numbers are key quantities when characterizing the structure of a piece of supercoiled DNA. Defined as double integrals over the shape of the double-helix, these numbers are not always straightforward to compute, though a simplified formula exists. We examine the range of applicability of this widely-used simplified formula, and show that it cannot be employed for plectonemic DNA. We show that inapplicability is due to a hypothesis of Fuller theorem that is not met. The hypothesis seems to have been overlooked in many works
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