2012
DOI: 10.1016/j.physd.2011.09.015
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Practical use of variational principles for modeling water waves

Abstract: This paper describes a method for deriving approximate equations for irrotational water waves. The method is based on a 'relaxed' variational principle, i.e., on a Lagrangian involving as many variables as possible. This formulation is particularly suitable for the construction of approximate water wave models, since it allows more freedom while preserving the variational structure. The advantages of this relaxed formulation are illustrated with various examples in shallow and deep waters, as well as arbitrary… Show more

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Cited by 51 publications
(114 citation statements)
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“…However, our study contains a certain number of new elements with respect to the existing state of the art. Namely, our derivation procedure relies on a generalised Lagrangian principle of the water wave problem [15] which allows easily the derivations of approximations that cannot be obtained with more conventional asymptotic expansions. Indeed, we do not introduce explicitly any small parameter and our approximation is made through the choice of a suitable ansatz.…”
Section: Discussionmentioning
confidence: 99%
See 3 more Smart Citations
“…However, our study contains a certain number of new elements with respect to the existing state of the art. Namely, our derivation procedure relies on a generalised Lagrangian principle of the water wave problem [15] which allows easily the derivations of approximations that cannot be obtained with more conventional asymptotic expansions. Indeed, we do not introduce explicitly any small parameter and our approximation is made through the choice of a suitable ansatz.…”
Section: Discussionmentioning
confidence: 99%
“…Recently, we proposed a relaxed Lagrangian variational principle which allows much more freedom in constructing approximations compared to the classical formulations. Namely, the water wave equations can be obtained as EulerLagrange equations of the functional ∭ L d 2 x dt involving the Lagrangian density [15]:…”
Section: Mathematical Modelmentioning
confidence: 99%
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“…Recently, two authors of this manuscript proposed a generalization to Luke's Lagrangian [15]. The so-called 'relaxed variational principle' will be extensively used in this study and we proceed to a brief description of the main ideas behind this generalization.…”
Section: Relaxed Lagrangian Formulationmentioning
confidence: 99%