The hydrodynamical equations for an ideal fluid with vorticity are derived, in the Eulerian picture, from a constrained variationalprinciple, which, exploiting a two-fluid representation for the density field, both yields a consistent representation for the velocity field and allows one to develop a Hamiltonian formalism
This note is an introduction to the variational formulation of fluid dy-namics and the geometrical s...
The hydrostatic primitive equations of motion which have been used in large-scale weather prediction...
The Hamiltonian viewpoint of fluid mechanical systems with few and infinite number of degrees of fre...
The hydrodynamical equations for an ideal fluid with vorticity are derived, in the Eulerian picture,...
Summary A variational formulation is given for flows of a compressible ideal fluid by defining a Gal...
A Hamiltonian formalism for hydrodynamics of ideal fluids is developed with the help of Seliger and ...
AbstractMotivated from Arnold's variational characterization of the Euler equation in terms of geode...
The equations of hydrodynamics for a perfect fluid in general relativity are cast in Eulerian form, ...
A variational principle is derived for two-dimensional incompressible rotational fluid flow with a ...
The Lagrangian average (LA) of the ideal fluid equations preserves their fundamental transport struc...
Variational principles in classical fluid mechanics and electromagnetism have sprinkled the literatu...
In this paper we give a brief review of the recent results obtained by the author and his co-authors...
These lecture notes are concerned with the derivation of the fluid mechanics equations via Hamilton'...
We present a formalism for Newtonian multifluid hydrodynamics derived from an unconstrained variatio...
A rigorous method for introducing the variational principle describing relativistic ideal hydrodynam...
This note is an introduction to the variational formulation of fluid dy-namics and the geometrical s...
The hydrostatic primitive equations of motion which have been used in large-scale weather prediction...
The Hamiltonian viewpoint of fluid mechanical systems with few and infinite number of degrees of fre...
The hydrodynamical equations for an ideal fluid with vorticity are derived, in the Eulerian picture,...
Summary A variational formulation is given for flows of a compressible ideal fluid by defining a Gal...
A Hamiltonian formalism for hydrodynamics of ideal fluids is developed with the help of Seliger and ...
AbstractMotivated from Arnold's variational characterization of the Euler equation in terms of geode...
The equations of hydrodynamics for a perfect fluid in general relativity are cast in Eulerian form, ...
A variational principle is derived for two-dimensional incompressible rotational fluid flow with a ...
The Lagrangian average (LA) of the ideal fluid equations preserves their fundamental transport struc...
Variational principles in classical fluid mechanics and electromagnetism have sprinkled the literatu...
In this paper we give a brief review of the recent results obtained by the author and his co-authors...
These lecture notes are concerned with the derivation of the fluid mechanics equations via Hamilton'...
We present a formalism for Newtonian multifluid hydrodynamics derived from an unconstrained variatio...
A rigorous method for introducing the variational principle describing relativistic ideal hydrodynam...
This note is an introduction to the variational formulation of fluid dy-namics and the geometrical s...
The hydrostatic primitive equations of motion which have been used in large-scale weather prediction...
The Hamiltonian viewpoint of fluid mechanical systems with few and infinite number of degrees of fre...
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