Slow motion for the 1D Swift-Hohenberg equation

Abstract

The goal of this paper is to study the behavior of certain solutions to the Swift-Hohenberg equation on a one-dimensional torus T. Combining results from -convergence and ODE theory, it is shown that solutions corresponding to initial data that is L1-close to a jump function v, remain close to v for large time. This can be achieved by regarding the equation as the L2-gradient flow of a second order energy functional, and obtaining asymptotic lower bounds on this energy in terms of the number of jumps of v.