Uniform stabilization of numerical schemes for the critical generalized Korteweg-de Vries equation with damping

Abstract: This work is devoted to the analysis of a fully-implicit numerical scheme for the critical generalized Korteweg-de Vries equation (GKdV with p = 4) in a bounded domain with a localized damping term. The damping is supported in a subset of the domain, so that the solutions of the continuous model issuing from small data are globally defined and exponentially decreasing in the energy space. Based in this asymptotic behavior of the solution, we introduce a finite difference scheme, which despite being one of the … Show more

“…Next, the sense of the term hy j ixxx is similar to the parabolic regularization of the KdV equation (see [30,31] and the equality (31)). It should be noted also that a similar Q 1 approach to the nonlinearity x u 2 digitization has been presented and successfully used in [30][31][32][33] for KdV-type equations. The special form (29) for nonlinear dispersive terms Q 2 allows us to avoid instabilities for even solutions.…”

A finite difference scheme for smooth solutions of the general Degasperis–Procesi equation

“…Next, the sense of the term hy j ixxx is similar to the parabolic regularization of the KdV equation (see [30,31] and the equality (31)). It should be noted also that a similar Q 1 approach to the nonlinearity x u 2 digitization has been presented and successfully used in [30][31][32][33] for KdV-type equations. The special form (29) for nonlinear dispersive terms Q 2 allows us to avoid instabilities for even solutions.…”

A finite difference scheme for smooth solutions of the general Degasperis–Procesi equation

“…In this section we provide some numerical simulations showing the effectiveness of our control design. In order to discretize our KdV equation, we use a finite difference scheme inspired from [15]. The final time for simulations is denoted by T f inal .…”

Output feedback stabilization of the Korteweg–de Vries equation

“…The convergence of the numerical method is proved in Matsuo and Furihata [8]. Pazoto et al [15] proposed a finite difference scheme which solves the critical generalilzed Kortewetgde Vries equation (GKdV-4) in a bounded domain. The higher-power term u 4 u x was rewritten as a linear combination of other derivatives in order to obtain specific conservation properties.…”

Finite difference scheme for a high order nonlinear Schrodinger equation with localized damping