论文信息 - Motion of Vortex lines in the Ginzburg-Landau model

Motion of Vortex lines in the Ginzburg-Landau model

Equations of motion for vortex lines in the Ginzburg-Landau theory are derived. We construct asymptotic approximations for the complex order parameter which are valid in the core region and in the far field. Using the method of matched asymptotic expansions we show that, to leading order, the line moves in the binormal direction with a curvature-dependent velocity. We also consider the contribution of remote parts of the line, interaction between several vortex lines and interaction with external fields.

Jacob Rubinstein | Len M. Pismen | J. Rubinstein | L. Pismen

[1] A. D. Young,et al. An Introduction to Fluid Mechanics , 1968 .

[2] J. Keller,et al. Fast reaction, slow diffusion, and curve shortening , 1989 .

[3] N. D. Mermin,et al. The topological theory of defects in ordered media , 1979 .

[4] H. Hasimoto,et al. A soliton on a vortex filament , 1972, Journal of Fluid Mechanics.

[5] Joseph B. Keller,et al. Stability of periodic plane waves , 1987 .

[6] J. Rubinstein. Self-induced motion of line defects , 1991 .

[7] Pismen Lm,et al. Mobility of singularities in the dissipative Ginzburg-Landau equation. , 1990 .

[8] Yoshiki Kuramoto,et al. Chemical Oscillations, Waves, and Turbulence , 1984, Springer Series in Synergetics.

[9] Eberhard Bodenschatz,et al. Structure and dynamics of dislocations in anisotropic pattern-forming systems , 1988 .

[10] C. Gorter,et al. Progress in low temperature physics , 1964 .

[11] John C. Neu,et al. Vortices in complex scalar fields , 1990 .

[12] Alain Pumir,et al. Vortex dynamics and the existence of solutions to the Navier–Stokes equations , 1987 .