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Formation of singularities in Hall magnetohydrodynamics

Published online by Cambridge University Press:  26 August 2009

MANUEL NÚÑEZ
MANUEL NÚÑEZ*
Affiliation:
Departamento de Análisis Matemático, Universidad de Valladolid, 47005 Valladolid, Spain
*
Email address for correspondence: mnjmhd@am.uva.es
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Abstract

Hall magnetohydrodynamics has proved a useful model in several physical phenomena, in particular, in fast magnetic reconnection. The induction equation for this model involves the nonlinear Hall term which has been suspected to imply loss of regularity and in particular formation of singularities of the current density. Numerical simulations strongly suggest that this is the case, but so far a rigorous proof was lacking. We show that for a particular axisymmetric geometry, certain integrals of the magnetic field satisfy a differential inequality that leads to a finite-time blow-up of the field gradient, and therefore of the current density. We may interpret this as a breakdown of the field regularity and the formation of discontinuous solutions.

Type
Papers
Information
Journal of Fluid Mechanics , Volume 634 , 10 September 2009 , pp. 499 - 507
Copyright
Copyright © Cambridge University Press 2009

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References

REFERENCES

Biskamp, D. 2000 Magnetic Reconnection in Plasmas. Cambridge University press.CrossRefGoogle Scholar
Chen, F. F. 1983 Introduction to Plasma Physics and Controlled Fusion. Plenum Press.Google Scholar
Cho, J. & Lazarian, A. 2004 The anisotropy of electron magnetohydrodynamic turbulence. Astrophys. J. Lett. 615, L41L44.CrossRefGoogle Scholar
Deng, J., Hou, T. Y. & Yu, X. 2006 Improved geometric conditions for non-blowup of the three-dimensional incompressible Euler equation. Commun. Part. Differ. Equ. 31, 293306.CrossRefGoogle Scholar
Dreher, J., Ruban, V. & Grauer, R. 2005 Axisymmetric flows in Hall MHD: a tendency towards finite-time singularity formation. Phys. Scr. 72, 451455.CrossRefGoogle Scholar
Gibbon, J. D., Moore, D. R. & Stuart, J. T. 2003 Exact, infinite energy, blow-up solutions of the three-dimensional Euler equations. Nonlinearity 16, 18231831.CrossRefGoogle Scholar
Gordeev, A. V., Kingsep, A. S. & Rudakov, L. I. 1994 Electron magnetohydrodynamics. Phys. Rep. 243 (5), 215315CrossRefGoogle Scholar
Kerr, R. M. 1993 Evidence for a singularity of the three-dimensional incompressible Euler equations. Phys. Fluids A 5, 17251746.CrossRefGoogle Scholar
Li, T. & Wang, D. 2006 Blow up phenomena of solutions to the Euler equations for compressible fluid flow. J. Differ. Equ. 221, 91101.CrossRefGoogle Scholar
Pandey, B. P. & Wardle, M. 2008 Hall magnetohydrodynamics of partially ionized plasmas. MNRAS 385 (4), 22692278.CrossRefGoogle Scholar
Peltz, R. B. 2001 Symmetry and the hydrodynamic blow-up problem. J. Fluid Mech. 444, 299320.CrossRefGoogle Scholar
Schekochihin, A. A., Cowley, S. C., Dorland, W., Hammett, G. W., Howes, G. G., Quataert, E. & Tatsuno, T. 2009 Astrophysical gyrokinetics: kinetic and fluid turbulent cascades in magnetized weakly collisional plasmas. Astrophys. J. Suppl. Ser. 182 (1), 310377.CrossRefGoogle Scholar
Shay, M. A., Drake, J. F., Rogers, B. N. & Denton, R. E. 2001 Alfvénic collisionless magnetic reconnection and the Hall term. J. Geophys. Res. 106, 37593772.CrossRefGoogle Scholar
Simader, C. G. & Sohr, H. 1992 A new approach to the Helmholtz decomposition and the Neumann problem in Lq-spaces for bounded and exterior domains. In Mathematical Problems Relating to the Navier–Stokes Equations (ed. Galdi, G. P.), Ser. Adv. Math. Appl. Sci., pp. 135. World Scientic.Google Scholar
Sonnerup, B. U. O. 1970 Magnetic field reconnection in a highly conducting incompressible fluid. J. Plasma Phys. 4, 161174.CrossRefGoogle Scholar
Wareing, C. J. & Hollerbach, R. 2009 Forward and inverse cascades in decaying two-dimensional electron magnetohydrodynamic turbulence. Phys. Plasmas 16, 042307.CrossRefGoogle Scholar
Yeh, T. & Axford, W. I. 1970 On the reconnection of magnetic field lines in conducting fluids. J. Plasma Phys. 4, 207229.CrossRefGoogle Scholar