We analyse the hyperbolicity of our multilayer shallow water equations that include the complete Coriolis force due to the Earth’s rotation. Shallow water theory represents flows in which the vertical shear is concentrated into vortex sheets between layers of uniform velocity. Such configurations are subject to Kelvin–Helmholtz instabilities, with arbitrarily large growth rates for sufficiently short wavelength disturbances. These instabilities manifest themselves through a loss of hyper-bolicity in the shallow water equations, rendering them ill-posed for the solution of initial value problems. We show that, in the limit of vanishingly small density difference between the two layers, our two-layer shallow water equations remain hyperbolic ...
This paper is devoted to the study of water waves under the influence of the gravity and the Corioli...
The instabilities of shallow shear flows are analyzed to study exchanges processes across shear flow...
Within the framework of shallow-water magnetohydrodynamics, we investigate the linear instability of...
We analyse the hyperbolicity of our multilayer shallow water equations that include the complete Cor...
The two-layer shallow water system looses hyperbolicity if the mag- nitude of the shear velocity is...
Two-layer shallow water equations describe flows that consist of two layers of inviscid fluid of dif...
Abstract. This paper presents a viscous Shallow Water type model with new Coriolis terms, and some l...
Two-layer shallow water equations describe flows that consist of two layers of inviscid fluid of dif...
In studies of the ocean it has become conventional to retain only the component of the Coriolis forc...
International audienceThis paper presents a viscous Shallow Water type model with new Coriolis terms...
International audienceConsistent shallow-water equations are derived on the rotating sphere with top...
Two-layer and multi-layer depth-averaged models have become popular for simulating exchange flows, s...
The derivation of shallow water models from Navier–Stokes equations is revisited yielding a class of...
The dynamics of planetary and stellar objects are dominated by the fluid motions of electrically con...
Exact solutions of the nonlinear shallow water wave equations were found by Thacker [1] for friction...
This paper is devoted to the study of water waves under the influence of the gravity and the Corioli...
The instabilities of shallow shear flows are analyzed to study exchanges processes across shear flow...
Within the framework of shallow-water magnetohydrodynamics, we investigate the linear instability of...
We analyse the hyperbolicity of our multilayer shallow water equations that include the complete Cor...
The two-layer shallow water system looses hyperbolicity if the mag- nitude of the shear velocity is...
Two-layer shallow water equations describe flows that consist of two layers of inviscid fluid of dif...
Abstract. This paper presents a viscous Shallow Water type model with new Coriolis terms, and some l...
Two-layer shallow water equations describe flows that consist of two layers of inviscid fluid of dif...
In studies of the ocean it has become conventional to retain only the component of the Coriolis forc...
International audienceThis paper presents a viscous Shallow Water type model with new Coriolis terms...
International audienceConsistent shallow-water equations are derived on the rotating sphere with top...
Two-layer and multi-layer depth-averaged models have become popular for simulating exchange flows, s...
The derivation of shallow water models from Navier–Stokes equations is revisited yielding a class of...
The dynamics of planetary and stellar objects are dominated by the fluid motions of electrically con...
Exact solutions of the nonlinear shallow water wave equations were found by Thacker [1] for friction...
This paper is devoted to the study of water waves under the influence of the gravity and the Corioli...
The instabilities of shallow shear flows are analyzed to study exchanges processes across shear flow...
Within the framework of shallow-water magnetohydrodynamics, we investigate the linear instability of...