Legendre Pseudospectral Approximation of Boussinesq Systems and Applications to Wave Breaking

Authors

  • Magnar Bjørkavåg Department of Mathematics, University of Bergen, PO Box 7800, 5020 Bergen, Norway
  • Henrik Kalisch Department of Mathematics, University of Bergen, PO Box 7800, 5020 Bergen, Norway
  • Zahra Khorsand Department of Mathematics, University of Bergen, PO Box 7800, 5020 Bergen, Norway
  • Dimitrios Mitsotakis School of Mathematics and Statistics, Victoria University of Wellington, New Zealand

DOI:

https://doi.org/10.4208/jms.v49n3.16.02

Keywords:

Boussinesq system, Legendre projection, undular bore, wave breaking, boundary conditions, spectral accuracy.

Abstract

In this paper, we propose a spectral projection of a regularized Boussinesq system for wave propagation on the surface of a fluid. The spectral method is based on the use of Legendre polynomials, and is able to handle time-dependent Dirichlet boundary conditions with spectral accuracy.
The algorithm is applied to the study of undular bores, and in particular to the onset of wave breaking connected with undular bores. As proposed in [2], an improved version of the breaking criterion recently introduced in [5] is used. This tightened breaking criterion together with a careful choice of the relaxation parameter yields rather accurate predictions of the onset of breaking in the leading wave of an undular bore.

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Published

2022-05-11

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Issue

Vol. 49 No. 3 (2016)

Section

Articles

How to Cite

Legendre Pseudospectral Approximation of Boussinesq Systems and Applications to Wave Breaking. (2022). Journal of Mathematical Study, 49(3), 221-237. https://doi.org/10.4208/jms.v49n3.16.02