Authors : Lannes, David (Author of the conference)
CIRM (Publisher )
Abstract :
A good understanding of waves in shallow water, typically in coastal regions, is important for several environmental and societal issues: submersion risks, protection of harbors, erosion, offshore structures, wave energies, etc.
The goal of this serie of lectures is to show how efficient asymptotic models can be derived from the full fluid equations (Navier-Stokes and Euler) and to point out several modelling, numerical and mathematical challenges that one still has to understand in order to describe correctly and efficiently such complex phenomena as wave breaking, overtopping, wave-structures interactions, etc.
I Derivation of several shallow water models
We will show how to derive several shallow water models (nonlinear shallow water equations, Boussinesq and Serre-Green-Naghdi systems) from the free surface Euler equations. We will consider first the case of an idealized configuration where no breaking waves are involved, where the water height does not vanish (no beach!), and where the flow is irrotational – this is the only configuration for which a rigorous justification of the asymptotic models can be justified.
II Brief analysis of these models.
We will briefly comment the mathematical structure of these equations, with a particular focus on the properties that are of interest for their numerical implementation. We will also discuss how these models behave in when the water height vanishes, since they are typically used in such configurations (see the lecture by P. Bonneton).
III Vorticity and turbulent effects.
We will propose a generalization of the derivation of the main shallow water models in the presence of vorticity, and show that the standard irrotational shallow water models must be coupled with an equation for a ”turbulent” tensor. We will also make the link with a modelling of wave breaking proposed by Gavrilyuk and Richard in which wave breaking is taken into account as a source term in this additional equation.
IV Floating objects.
This last section will be devoted to the description of a new approach to describe the interaction of waves in shallow water with floating objects, which leads to several interesting mathematical and numerical issues.
Keywords : PDEs in connection with geophysics; water wave
MSC Codes :
35-XX
- Partial differential equations
86A05
- Hydrology, hydrography, oceanography
35Q86
- PDEs in connection with geophysics
Additional resources :
http://smai.emath.fr/cemracs/cemracs19/resumesPDF/lannes.pdf
Film maker : Hennenfent, Guillaume
Language : English
Available date : 30/08/2019
Conference Date : 18/07/2019
Subseries : Research School
arXiv category : Analysis of PDEs ; Atmospheric and Oceanic Physics ; Fluid Dynamics
Mathematical Area(s) : Mathematical Physics ; PDE
Format : MP4 (.mp4) - HD
Video Time : 01:04:46
Targeted Audience : Researchers
Download : https://videos.cirm-math.fr/2019-07-18_Lannes_Part2.mp4
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Event Title : CEMRACS : Geophysical Fluids, Gravity Flows / CEMRACS : Fluides géophysiques, écoulements gravitaires Event Organizers : Duran, Arnaud ; Fabrèges, Benoit ; Lafitte, Pauline ; Lagoutière, Frédéric ; Marche, Fabien ; Rousset, Frédéric Dates : 15/07/2019 - 23/08/2019
Event Year : 2019
Event URL : https://conferences.cirm-math.fr/2084.html
DOI : 10.24350/CIRM.V.19548503
Cite this video as:
Lannes, David (2019). Modelling shallow water waves - Lecture 2. CIRM. Audiovisual resource. doi:10.24350/CIRM.V.19548503
URI : http://dx.doi.org/10.24350/CIRM.V.19548503
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Bibliography