Non-linear Stability of Modulated Fronts for the Swift-Hohenberg Equation

Abstract

We consider front solutions of the Swift-Hohenberg equation ∂t u= -(1+∂x2)2 u +ε 2 u -u3. These are traveling waves which leave in their wake a periodic pattern in the laboratory frame. Using renormalization techniques and a decomposition into Bloch waves, we show the non-linear stability of these solutions. It turns out that this problem is closely related to the question of stability of the trivial solution for the model problem ∂t u(x,t) = ∂x2 u (x,t)+(1+(x-ct))u(x,t)+u(x,t)p with p>3. In particular, we show that the instability of the perturbation ahead of the front is entirely compensated by a diffusive stabilization which sets in once the perturbation has hit the bulk behind the front.

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