Hostname: page-component-cd9895bd7-8ctnn Total loading time: 0 Render date: 2024-12-18T18:45:40.615Z Has data issue: false hasContentIssue false

Hydromagnetic screw dynamo

Published online by Cambridge University Press:  21 April 2006

Alexander Ruzmaikin
Affiliation:
Institute of Terrestrial Magnetism, Ionosphere and Radiowave Propagation, Academy of Sciences, Troitsk, Moscow Region, USSR
Dmitry Sokoloff
Affiliation:
Physics Department, Moscow State University, Lenin Hills, Moscow, USSR
Anvar Shukurov
Affiliation:
Space Research Institute, Academy of Sciences, Moscow, USSR

Abstract

We solve the problem of magnetic field generation by a laminar flow of conducting fluid with helical (screw-like) streamlines for large magnetic Reynolds numbers, Rm. Asymptotic solutions are obtained with help of the singular perturbation theory. The generated field concentrates within cylindrical layers whose position, the magnetic field configuration and the growth rate are determined by the distribution of the angular, Ω, and longitudinal, Vz, velocities along the radius. The growth rate is proportional to Rm−½. When Ω and Vz are identically distributed along the radius, the asymptotic forms are of the WKB type; for different distributions, singular-layer asymptotics of the Prandtl type arise. The solutions are qualitatively different from those obtained for solid-body screw motion. The generation threshold strongly depends on the velocity profiles.

Type
Research Article
Copyright
© 1988 Cambridge University Press

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

Baryshnikova, Yu. S. & Shukurov, A. M.1987 Oscillatory 2-dynamo: numerical investigation. Astr. Nachr. 307, 125132.Google Scholar
Begelman, M. C., Blanford, R. D. & Rees, M. J.1984 Theory of extragalactic radio sources. Rev. Mod. Phys. 56, 255351.Google Scholar
Braginsky, S. I.1964 Self-excitation of a magnetic field during the motion of a highly conducting fluid. Sov. Phys. JETP 20, 14621471.Google Scholar
Bridle, A. H. & Perley, R. A.1984 Extragalactic radio jets. Ann. Rev. Astron. Astrophys. 22, 319358.Google Scholar
Gailitis, A. & Freiberg, J.1976 On the theory of helical MHD dynamo. Magnitnaya Gidrodinamika 2, 36.Google Scholar
Gailitis, A. & Freiberg, J.1980 Characteristics of non-homogeneous helical MHD dynamo. Magnitnaya Gidrodinamika 1, 1519.Google Scholar
Gailitis, A. K., Freiberg, J. J. & Lielausis, O. A.1977 On possibilities to observe the magnetic field generation in the liquid sodium. Preprint LAFI-005, Salaspils.
Gilbert, A.1988 The Ponomarenko dynamo. Geophys. Astrophys. Fluid Dyn. (submitted).Google Scholar
Kirko, G. E.1985 Generation and Self-Excitation of Magnetic Fields in Engineering Devices. Moscow: Nauka (in Russian).
Lortz, D.1968 Exact solutions of the hydromagnetic dynamo problem. Plasma Phys. 10, 967972.Google Scholar
Maslov, V. P. & Fedorjuk, M. V.1981 Semi-Classical Approximation in Quantum Mechanics. Reidel Press.
Moffatt, H. K.1978 Magnetic Field Generation in Electrically Conducting Fluids. Cambridge University Press.
Molchanov, S. A., Ruzmaikin, A. A. & Sokoloff, D. D.1985 Kinematic dynamo in random flow. Sov. Phys. Usp. 28, 307326.Google Scholar
Ponomarenko, Yu. B.1973 On the theory of hydromagnetic dynamo. Zh. Prikl. Mekh. Tekhn. Fiz. (USSR) 6, 4751 [Trans. pp. 775–778].Google Scholar
Roberts, P. H.1987 Dynamo theory. In: Irreversible Phenomena and Dynamical Systems in Geosciences (eds. C. Nicolis & G. Nicolis), pp. 73133. Reidel.
Ruzmaikin, A. A., Sokoloff, D. D., Solovyev, A. A. & Shukurov, A. M. 1988a The Couette—Poiseuille flow as a screw dynamo. Magnitnaya Gidrodinamika (in press).Google Scholar
Ruzmaikin, A. A., Sokoloff, D. D. & Starchenko, S. V.1988b Excitation of non-axisymmetric modes of the Sun's mean magnetic field. Solar Phys. (in the press).Google Scholar
Sokoloff, D., Shukurov, A. & Ruzmaikin, A.1983 Asymptotic solution of the 2-dynamo problem. Geophys. Astrophys. Fluid Dyn. 25, 293307.Google Scholar
Sokoloff, D. D., Shukurov, A. M. & Shumkina, T. S.1989 Second-order asymptotic approximation in the screw dynamo problem. Magnitnaya Gidrodinamika (in press).Google Scholar
Solovyev, A. A.1985 Existence of magnetic dynamo for a dynamically admissible motion of a conductive fluid. Dokl. Akad. Nauk SSSR 282, 4448.Google Scholar
Solovyev, A. A.1987 Magnetic field excitation by conducting fluid flow at high magnetic Reynolds numbers. Izv. Akad. Nauk SSSR, Fiz. Zemli No. 5, 7780.Google Scholar
Van Dyke, M. 1975 Perturbation Methods in Fluid Mechanics. Stanford: Parabolic.
Zeldovich, Ya. B., Ruzmaikin, A. A. & Sokoloff, D. D.1983 Magnetic Fields in Astrophysics. Gordon & Breach Press.