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The Navier-Stokes system with temperature and salinity for free surface flows Part II: Numerical scheme and validation

Abstract : In this paper, we propose a numerical scheme for the layer-averaged Euler with variable density and the Navier-Stokes-Fourier systems presented in part I (Boittin et al., 2018). These systems model hydrostatic free surface flows with density variations. We show that the finite volume scheme presented is well balanced with regards to the steady state of the lake at rest and preserves the positivity of the water height. A maximum principle on the density is also proved as well as a discrete entropy inequality in the case of the Euler system with variable density. Some numerical validations are finally shown with comparisons to 3D analytical solutions and experiments.
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https://hal.inria.fr/hal-02510722
Contributor : Jacques Sainte-Marie <>
Submitted on : Wednesday, March 18, 2020 - 10:08:00 AM
Last modification on : Monday, March 30, 2020 - 12:04:02 PM

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  • HAL Id : hal-02510722, version 1

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Léa Boittin, François Bouchut, Marie-Odile Bristeau, Anne Mangeney, Jacques Sainte Marie, et al.. The Navier-Stokes system with temperature and salinity for free surface flows Part II: Numerical scheme and validation. 2020. ⟨hal-02510722⟩

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