Nonlinear Engineering (Nov 2024)
Global well-posedness and exponential decay estimates for semilinear Newell–Whitehead–Segel equation
Abstract
This article presents the application of the Faedo–Galerkin compactness method to establish the local well-posedness of the Newell–Whitehead–Segel equation. By analyzing a finite-dimensional approximate problem, the existence and uniqueness of a local solution were demonstrated. A priori estimates were derived, enabling the transition to the limit and the recovery of the original problem’s local solution. The study further proves the uniqueness and continuous dependence of the solution on initial data. Additionally, under certain conditions, it is shown that the energy norm of the solution decays exponentially over time, and the L2{L}^{2}-norm of the time derivative of the solution approaches zero asymptotically.
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