In this paper, we study the existence and stability of pulse solutions in a system with interacting instability mechanisms, that is described by a Ginzburg-Landau equation for an A-mode, coupled to a diffusion equation for a B-mode. Our main question is whether this coupling may stabilize solutions of the Ginzburg-Landau equation that are unstable when the interactions with the neutrally stable B-mode are not included in the model. The spatially homogeneous B-mode is supposed to be neutrally stable. This implies that the pulse solutions cannot decay exponentially, bul must decay with an algebraic rate as x - infty. As a consequence, the methods that exist in the literature by which the stability of pulses in singularly perturbed reaction-diffusion systems can be studied, need to be extended. This results in an 'algebraic NLEP approactV, that is expected to be relevant beyond the setting of this paper. As in the case of a (weakly) stable B-mode [7], we establish by the application of this approach, that the B-mode indeed introduces a mechanism that may stabilize pulses that are unstable when the interactions with the B-mode are not taken into account

CWI
Modelling, Analysis and Simulation [MAS]
Computational Dynamics

Doelman, A., Hek, G., & Valkhoff, N. (2006). Algebraically decaying pulses in a Ginzburg-Landau system with a neutrally stable mode. Modelling, Analysis and Simulation [MAS]. CWI.