Asymptotic stability of a Korteweg–de Vries equation with a two-dimensional center manifold
Local asymptotic stability analysis is conducted for an initial-boundary-value problem of a Korteweg–de Vries equation posed on a finite interval [0,2π7/3]{[0,2\pi\sqrt{7/3}]}. The equation comes with a Dirichlet boundary condition at the left end-point and both the Dirichlet and Neumann homogeneo...
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De Gruyter
2018-11-01
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| Series: | Advances in Nonlinear Analysis |
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| Online Access: | https://doi.org/10.1515/anona-2016-0097 |
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doaj-627f1810766b40e5a5f35ec1f52d3a942021-09-06T19:39:54ZengDe GruyterAdvances in Nonlinear Analysis2191-94962191-950X2018-11-017449751510.1515/anona-2016-0097Asymptotic stability of a Korteweg–de Vries equation with a two-dimensional center manifoldTang Shuxia0Chu Jixun1Shang Peipei2Coron Jean-Michel3Department of Mechanical & Aerospace Engineering, University of California, San Diego, La Jolla, CA 92093, USA; and UMR 7598 Laboratoire Jacques-Louis Lions, Université Pierre et Marie Curie (Paris 6), 75005 Paris, FranceDepartment of Applied Mathematics, School of Mathematics and Physics, University of Science and Technology Beijing, Beijing100083, P. R. ChinaSchool of Mathematical Sciences, Tongji University, Shanghai200092, P. R. ChinaUMR 7598 Laboratoire Jacques-Louis Lions, Université Pierre et Marie Curie (Paris 6), 75005Paris, FranceLocal asymptotic stability analysis is conducted for an initial-boundary-value problem of a Korteweg–de Vries equation posed on a finite interval [0,2π7/3]{[0,2\pi\sqrt{7/3}]}. The equation comes with a Dirichlet boundary condition at the left end-point and both the Dirichlet and Neumann homogeneous boundary conditions at the right end-point. It is known that the associated linearized equation around the origin is not asymptotically stable. In this paper, the nonlinear Korteweg–de Vries equation is proved to be locally asymptotically stable around the origin through the center manifold method. In particular, the existence of a two-dimensional local center manifold is presented, which is locally exponentially attractive. Analyzing the Korteweg–de Vries equation restricted on the local center manifold, we obtain a polynomial decay rate of the solution.https://doi.org/10.1515/anona-2016-0097korteweg–de vries equationnonlinearitycenter manifoldasymptotic stabilitypolynomial decay rate35q53 37l10 93d05 93d20 |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Tang Shuxia Chu Jixun Shang Peipei Coron Jean-Michel |
| spellingShingle |
Tang Shuxia Chu Jixun Shang Peipei Coron Jean-Michel Asymptotic stability of a Korteweg–de Vries equation with a two-dimensional center manifold Advances in Nonlinear Analysis korteweg–de vries equation nonlinearity center manifold asymptotic stability polynomial decay rate 35q53 37l10 93d05 93d20 |
| author_facet |
Tang Shuxia Chu Jixun Shang Peipei Coron Jean-Michel |
| author_sort |
Tang Shuxia |
| title |
Asymptotic stability of a Korteweg–de Vries equation with a two-dimensional center manifold |
| title_short |
Asymptotic stability of a Korteweg–de Vries equation with a two-dimensional center manifold |
| title_full |
Asymptotic stability of a Korteweg–de Vries equation with a two-dimensional center manifold |
| title_fullStr |
Asymptotic stability of a Korteweg–de Vries equation with a two-dimensional center manifold |
| title_full_unstemmed |
Asymptotic stability of a Korteweg–de Vries equation with a two-dimensional center manifold |
| title_sort |
asymptotic stability of a korteweg–de vries equation with a two-dimensional center manifold |
| publisher |
De Gruyter |
| series |
Advances in Nonlinear Analysis |
| issn |
2191-9496 2191-950X |
| publishDate |
2018-11-01 |
| description |
Local asymptotic stability analysis is conducted for an initial-boundary-value problem of a Korteweg–de Vries
equation posed on a finite interval [0,2π7/3]{[0,2\pi\sqrt{7/3}]}.
The equation comes with a Dirichlet
boundary condition at the left end-point and both the Dirichlet and Neumann
homogeneous boundary conditions at the right end-point. It is known that the
associated linearized equation around the origin is
not asymptotically stable. In this paper, the nonlinear
Korteweg–de Vries equation is proved to be
locally asymptotically stable around the origin through the center
manifold method.
In particular, the existence of a two-dimensional local center manifold is presented, which is locally exponentially attractive. Analyzing the Korteweg–de Vries equation restricted on the local center manifold, we obtain a polynomial decay rate of the solution. |
| topic |
korteweg–de vries equation nonlinearity center manifold asymptotic stability polynomial decay rate 35q53 37l10 93d05 93d20 |
| url |
https://doi.org/10.1515/anona-2016-0097 |
| work_keys_str_mv |
AT tangshuxia asymptoticstabilityofakortewegdevriesequationwithatwodimensionalcentermanifold AT chujixun asymptoticstabilityofakortewegdevriesequationwithatwodimensionalcentermanifold AT shangpeipei asymptoticstabilityofakortewegdevriesequationwithatwodimensionalcentermanifold AT coronjeanmichel asymptoticstabilityofakortewegdevriesequationwithatwodimensionalcentermanifold |
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1717769784021483520 |