Using the Hodge decomposition on bounded domains the compressible Euler equations of gas dynamics are reformulated using a density weighted vorticity and dilatation as primary variables, together with the entropy and density. This formulation is an extension to compressible flows of the well-known vorticity–stream function formulation of the incompressible Euler equations. The Hamiltonian and associated Poisson bracket for this new formulation of the compressible Euler equations are derived and extensive use is made of differential forms to highlight the mathematical structure of the equations. In order to deal with domains with boundaries also the Stokes–Dirac structure and the port-Hamiltonian formulation of the Euler equations in density...
This thesis poses a new geometric formulation for compressible Euler flows. A partial decomposition ...
We consider a two-dimensional compressible Euler system for a non-ideal gas, and use the characteris...
summary:This work is concerned with the numerical solution of inviscid compressible fluid flow in mo...
Using the Hodge decomposition on bounded domains the compressible Euler equations of gas dynamics ar...
Using the Hodge decomposition on bounded domains the ncompressible Euler equations of gas dynamics a...
Part I of this paper presented a systematic derivation of the Stokes Dirac structure underlying the ...
In this paper we give a brief review of the recent results obtained by the author and his co-authors...
We present a simple Hamiltonian formulation of the Euler equations for fluid flow in the Lagrangian ...
AbstractA Hamiltonian discretization of one-dimensional compressible fluid dynamics is made possible...
Numerical and analytical solutions to the steady compressible Euler equations corresponding to a com...
AbstractWe study the Stokes problem of incompressible fluid dynamics in two and three-dimension spac...
In this manuscript, a general formulation of 3-dimensional compressible fluids based on the port-Hami...
International audienceTurbulent compressible flows are encountered in many industrial applications, ...
Abstract We derive a new formulation of the 3D compressible Euler equations exhibitin...
AbstractThe Euler equations for inviscid incompressible fluid flow have a Hamiltonian structure in E...
This thesis poses a new geometric formulation for compressible Euler flows. A partial decomposition ...
We consider a two-dimensional compressible Euler system for a non-ideal gas, and use the characteris...
summary:This work is concerned with the numerical solution of inviscid compressible fluid flow in mo...
Using the Hodge decomposition on bounded domains the compressible Euler equations of gas dynamics ar...
Using the Hodge decomposition on bounded domains the ncompressible Euler equations of gas dynamics a...
Part I of this paper presented a systematic derivation of the Stokes Dirac structure underlying the ...
In this paper we give a brief review of the recent results obtained by the author and his co-authors...
We present a simple Hamiltonian formulation of the Euler equations for fluid flow in the Lagrangian ...
AbstractA Hamiltonian discretization of one-dimensional compressible fluid dynamics is made possible...
Numerical and analytical solutions to the steady compressible Euler equations corresponding to a com...
AbstractWe study the Stokes problem of incompressible fluid dynamics in two and three-dimension spac...
In this manuscript, a general formulation of 3-dimensional compressible fluids based on the port-Hami...
International audienceTurbulent compressible flows are encountered in many industrial applications, ...
Abstract We derive a new formulation of the 3D compressible Euler equations exhibitin...
AbstractThe Euler equations for inviscid incompressible fluid flow have a Hamiltonian structure in E...
This thesis poses a new geometric formulation for compressible Euler flows. A partial decomposition ...
We consider a two-dimensional compressible Euler system for a non-ideal gas, and use the characteris...
summary:This work is concerned with the numerical solution of inviscid compressible fluid flow in mo...