Add to ORKGAbstract. We analyze a new formulation of the Stokes equations in three-dimensional axisymmetric geometries, relying on Fourier expansion with respect to the angular variable: the problem for each Fourier coefficient is two-dimensional and has six scalar unknowns, corresponding to the vector potential and the vorticity. A spectral discretization is built on this formulation, which leads to an exactly divergence-free discrete velocity. We prove optimal error estimates
A numerical algorithm intended for the study of flows in a cylindrical container under laminar flow ...
A numerical algorithm intended for the study of flows in a cylindrical container under laminar flow ...
A numerical algorithm intended for the study of flows in a cylindrical container under laminar flow ...
We analyze a new formulation of the Stokes equations in three-dimensional axisymmetric geometries, r...
We develop a framework for solving the stationary, incompressible Stokes equations in an axisymmetri...
We develop a framework for solving the stationary, incompressible Stokes equations in an axisymmetri...
We develop a framework for solving the stationary, incompressible Stokes equations in an axisymmetri...
Abstract: The Stokes problem in a tridimensional axisymmetric domain results into a countable family...
A primitive variable spectral method for simulating incompressible viscous flows inside a finite cyl...
A primitive variable spectral method for simulating incompressible viscous flows inside a finite cyl...
A primitive variable spectral method for simulating incompressible viscous flows inside a finite cyl...
A primitive variable spectral method for simulating incompressible viscous flows inside a finite cyl...
The method of Moser, Moin, and Leonard (1983) for the approximation of the three-dimensional Navier-...
The method of Moser, Moin, and Leonard (1983) for the approximation of the three-dimensional Navier-...
The method of Moser, Moin, and Leonard (1983) for the approximation of the three-dimensional Navier-...
A numerical algorithm intended for the study of flows in a cylindrical container under laminar flow ...
A numerical algorithm intended for the study of flows in a cylindrical container under laminar flow ...
A numerical algorithm intended for the study of flows in a cylindrical container under laminar flow ...
We analyze a new formulation of the Stokes equations in three-dimensional axisymmetric geometries, r...
We develop a framework for solving the stationary, incompressible Stokes equations in an axisymmetri...
We develop a framework for solving the stationary, incompressible Stokes equations in an axisymmetri...
We develop a framework for solving the stationary, incompressible Stokes equations in an axisymmetri...
Abstract: The Stokes problem in a tridimensional axisymmetric domain results into a countable family...
A primitive variable spectral method for simulating incompressible viscous flows inside a finite cyl...
A primitive variable spectral method for simulating incompressible viscous flows inside a finite cyl...
A primitive variable spectral method for simulating incompressible viscous flows inside a finite cyl...
A primitive variable spectral method for simulating incompressible viscous flows inside a finite cyl...
The method of Moser, Moin, and Leonard (1983) for the approximation of the three-dimensional Navier-...
The method of Moser, Moin, and Leonard (1983) for the approximation of the three-dimensional Navier-...
The method of Moser, Moin, and Leonard (1983) for the approximation of the three-dimensional Navier-...
A numerical algorithm intended for the study of flows in a cylindrical container under laminar flow ...
A numerical algorithm intended for the study of flows in a cylindrical container under laminar flow ...
A numerical algorithm intended for the study of flows in a cylindrical container under laminar flow ...