Hamiltonian regularisation of shallow water equations with uneven bottom

Didier Clamond, Denys Dutykh, Dimitrios Mitsotakis

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2 Scopus citations

Abstract

The regularisation of nonlinear hyperbolic conservation laws has been a problem of great importance for achieving uniqueness of weak solutions and also for accurate numerical simulations. In a recent work, the first two authors proposed a so-called Hamiltonian regularisation for nonlinear shallow water and isentropic Euler equations. The characteristic property of this method is that the regularisation of solutions is achieved without adding any artificial dissipation or dispersion. The regularised system possesses a Hamiltonian structure and, thus, formally preserves the corresponding energy functional. In the present article we generalise this approach to shallow water waves over general, possibly time-dependent, bottoms. The proposed system is solved numerically with continuous Galerkin method and its solutions are compared with the analogous solutions of the classical shallow water and dispersive Serre-Green-Naghdi equations. The numerical results confirm the absence of dispersive and dissipative effects in presence of bathymetry variations.

Original languageBritish English
Article number42LT01
JournalJournal of Physics A: Mathematical and Theoretical
Volume52
Issue number42
DOIs
StatePublished - 23 Sep 2019

Keywords

  • energy conservation
  • regularization
  • shallow water flows
  • uneven bottom
  • well-balanced

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