Ginzburg–Landau equation

(Redirected from Ginzburg-Landau equation)

The Ginzburg–Landau equation, named after Vitaly Ginzburg and Lev Landau, describes the nonlinear evolution of small disturbances near a finite wavelength bifurcation from a stable to an unstable state of a system. At the onset of finite wavelength bifurcation, the system becomes unstable for a critical wavenumber which is non-zero. In the neighbourhood of this bifurcation, the evolution of disturbances is characterised by the particular Fourier mode for with slowly varying amplitude (more precisely the real part of ). The Ginzburg–Landau equation is the governing equation for . The unstable modes can either be non-oscillatory (stationary) or oscillatory.[1][2]

For non-oscillatory bifurcation, satisfies the real Ginzburg–Landau equation

which was first derived by Alan C. Newell and John A. Whitehead[3] and by Lee Segel[4] in 1969. For oscillatory bifurcation, satisfies the complex Ginzburg–Landau equation

which was first derived by Keith Stewartson and John Trevor Stuart in 1971.[5] Here and are real constants.

When the problem is homogeneous, i.e., when is independent of the spatial coordinates, the Ginzburg–Landau equation reduces to Stuart–Landau equation. The Swift–Hohenberg equation results in the Ginzburg–Landau equation.

Substituting , where is the amplitude and is the phase, one obtains the following equations

Some solutions of the real Ginzburg–Landau equation

edit

Steady plane-wave type

edit

If we substitute   in the real equation without the time derivative term, we obtain

 

This solution is known to become unstable due to Eckhaus instability for wavenumbers  

Steady solution with absorbing boundary condition

edit

Once again, let us look for steady solutions, but with an absorbing boundary condition   at some location. In a semi-infinite, 1D domain  , the solution is given by

 

where   is an arbitrary real constant. Similar solutions can be constructed numerically in a finite domain.

Some solutions of the complex Ginzburg–Landau equation

edit

Traveling wave

edit

The traveling wave solution is given by

 

The group velocity of the wave is given by   The above solution becomes unstable due to Benjamin–Feir instability for wavenumbers  

Hocking–Stewartson pulse

edit

Hocking–Stewartson pulse refers to a quasi-steady, 1D solution of the complex Ginzburg–Landau equation, obtained by Leslie M. Hocking and Keith Stewartson in 1972.[6] The solution is given by

 

where the four real constants in the above solution satisfy

 
 

Coherent structure solutions

edit

The coherent structure solutions are obtained by assuming   where  . This leads to

 

where   and  

See also

edit

References

edit
  1. ^ Cross, M. C., & Hohenberg, P. C. (1993). Pattern formation outside of equilibrium. Reviews of modern physics, 65(3), 851.
  2. ^ Cross, M., & Greenside, H. (2009). Pattern formation and dynamics in nonequilibrium systems. Cambridge University Press.
  3. ^ Newell, A. C., & Whitehead, J. A. (1969). Finite bandwidth, finite amplitude convection. Journal of Fluid Mechanics, 38(2), 279-303.
  4. ^ Segel, L. A. (1969). Distant side-walls cause slow amplitude modulation of cellular convection. Journal of Fluid Mechanics, 38(1), 203-224.
  5. ^ Stewartson, K., & Stuart, J. T. (1971). A non-linear instability theory for a wave system in plane Poiseuille flow. Journal of Fluid Mechanics, 48(3), 529-545.
  6. ^ Hocking, L. M., & Stewartson, K. (1972). On the nonlinear response of a marginally unstable plane parallel flow to a two-dimensional disturbance. Proceedings of the Royal Society of London. A. Mathematical and Physical Sciences, 326(1566), 289-313.