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Preprint 2023-21

Boumediene Chentouf, Aissa Guesmia, Mauricio Sepúlveda, Rodrigo Véjar:

Boundary stabilization of the Korteweg-de Vries-Burgers equation with an infinite memory-type control and applications: a qualitative and numerical analysis

Abstract:

This article is intended to present a qualitative and numerical analysis of well-posedness and boundary stabilization problems of the well-known Korteweg-de Vries-Burgers equation. Assuming that the boundary control is of memory type, the history approach is adopted in order to deal with the memory term. Under sufficient conditions on the physical parameters of the system and the memory kernel of the control, the system is shown to be well-posed by combining the semigroups approach of linear operators and the fixed point theory. Then, energy decay estimates are provided by applying the multiplier method. An application to the Kuramoto-Sivashinsky equation will be also given. Moreover, we present a numerical analysis based on a finite differences method and provide numerical examples illustrating our theoretical results.

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This preprint gave rise to the following definitive publication(s):

Boumediene CHENTOUF, Aissa GUESMIA, Mauricio SEPúLVEDA, Rodrigo VéJAR: Boundary stabilization of the Korteweg-de Vries-Burgers equation with an infinite memory-type control and applications: a qualitative and numerical analysis. Applied Mathematics and Optimization, vol. 90, 2, article number: 32, (2024).

 

 

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