Non-Vanishing Profiles for the Kuramoto-Sivashinsky Equation on the Infinite Line
Abstract
We study the Kuramoto-Sivashinsky equation on the infinite line with initial conditions having arbitrarily large limits Y at x=∞. We show that the solutions have the same limits for all positive times. This implies that an attractor for this equation cannot be defined in L∞. To prove this, we consider profiles with limits at x=∞, and show that initial conditions L2-close to such profiles lead to solutions which remain L2-close to the profile for all times. Furthermore, the difference between these solutions and the initial profile tends to 0 as x∞, for any fixed time t>0. Analogous results hold for L2-neighborhoods of periodic stationary solutions. This implies that profiles and periodic stationary solutions partition the phase space into mutually unattainable regions.
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