Dispersive shallow water wave modelling. Part III: Model derivation on a globally spherical geometry

Gayaz Khakimzyanov, Denys Dutykh, Zinaida Fedotova

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10 Scopus citations

Abstract

The present article is the third part of a series of papers devoted to the shallow water wave modelling. In this part we investigate the derivation of some long wave models on a deformed sphere. We propose first a suitable for our purposes formulation of the full EULER equations on a sphere. Then, by applying the depth-averaging procedure we derive first a new fully nonlinear weakly dispersive base model. After this step we show how to obtain some weakly nonlinear models on the sphere in the so-called BOUSSINESQ regime. We have to say that the proposed base model contains an additional velocity variable which has to be specified by a closure relation. Physically, it represents a dispersive correction to the velocity vector. So, the main outcome of our article should be rather considered as a whole family of long wave models.

Original languageBritish English
Pages (from-to)315-360
Number of pages46
JournalCommunications in Computational Physics
Volume23
Issue number2
DOIs
StatePublished - 2018

Keywords

  • Flow on sphere
  • Long wave approximation
  • Motion on a sphere
  • Nonlinear dispersive waves
  • Spherical geometry

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