On Asymptotic Stability of Kink for Relativistic Ginzburg–Landau Equations

1 consider the nonlinear stability of plane wave solutions to a Ginzburg-Landau equation with additional fifth-order terms and cubic terms containing spatial derivatives. 1 show that, under the constraint that the diffusion coefficient be real, these waves are stable. Furthermore, it is shown that t

We study analytically the asymptotic linear stability of ÿxed-modulus dissipative-dispersive localized solutions of the one-dimensional quintic complex Ginzburg-Landau (GL) equation in the region where there exists a coexistence of homogeneous attractors. The linear analysis gives an indication for

## Let be a domain in R n occupied by a superconductor material. According to the Ginzburg-Landau theory, the order parameter (complex-valued) and the induced magnetic potential A of the material must minimize the following Ginzburg-Landau functional: where H is the applied magnetic ÿeld and k is