Add to ORKGThe paper deals with the problem of vortex motion of an incompressible perfect fluid in bounded domains. The research is confined to chosen cases of steady velocity fields within rectangular, circular and elliptic regions with rigid boundaries. The solution to the initial-value problem of the fluid flow for the assumed velocity fields is the primary object of this paper. It is demonstrated that individual particles of the fluid have their own periods of motion and thus, one should be careful in describing such problems by means of discrete methods, especially in the Lagrangian variables. The problem discussed has its origin in numerical analysis of water waves by means of the finite difference or the finite element method
We consider the motion of several solids in a bounded cavity filled with a perfect incompressible fl...
A new formulation for two-dimensional fluid–rigid body interaction problems is developed. In particu...
Abstract—In this paper, we obtain a nonlinear Poisson structure and two first integrals in the probl...
The paper describes the problem of discrete formulation of plane fluid flows in material description...
The resolvability and differential properties in the solution of the boudary problems for Euler equa...
The motion of a uniform vortex in presence of a pointwise one in an isochoric, inviscid fluid is ana...
The numerical scheme for the method of discrete vortexes, scheme originating in problems of the body...
Abstract. The vortex method for the initial-boundary value problems of the Euler equations for incom...
The investigation about the theory of vortex motion with vorticity continuously distributed in the p...
In this paper the authors study vortex method for 2-dimensionsal Euler equations of incompressible f...
International audienceThe vortex method is a common numerical and theoretical approach used to imple...
In this work, the vortex method for the initial boundary value problem of Euler's equation is c...
A new mathematical approach to kinematics and dynamics of planar uniform vortices in an incompressib...
Very accurate methods, based on boundary integral techniques, are developed for the study of multipl...
The vortex method for the initial-boundary value problems of the Euler equations for incompressible ...
We consider the motion of several solids in a bounded cavity filled with a perfect incompressible fl...
A new formulation for two-dimensional fluid–rigid body interaction problems is developed. In particu...
Abstract—In this paper, we obtain a nonlinear Poisson structure and two first integrals in the probl...
The paper describes the problem of discrete formulation of plane fluid flows in material description...
The resolvability and differential properties in the solution of the boudary problems for Euler equa...
The motion of a uniform vortex in presence of a pointwise one in an isochoric, inviscid fluid is ana...
The numerical scheme for the method of discrete vortexes, scheme originating in problems of the body...
Abstract. The vortex method for the initial-boundary value problems of the Euler equations for incom...
The investigation about the theory of vortex motion with vorticity continuously distributed in the p...
In this paper the authors study vortex method for 2-dimensionsal Euler equations of incompressible f...
International audienceThe vortex method is a common numerical and theoretical approach used to imple...
In this work, the vortex method for the initial boundary value problem of Euler's equation is c...
A new mathematical approach to kinematics and dynamics of planar uniform vortices in an incompressib...
Very accurate methods, based on boundary integral techniques, are developed for the study of multipl...
The vortex method for the initial-boundary value problems of the Euler equations for incompressible ...
We consider the motion of several solids in a bounded cavity filled with a perfect incompressible fl...
A new formulation for two-dimensional fluid–rigid body interaction problems is developed. In particu...
Abstract—In this paper, we obtain a nonlinear Poisson structure and two first integrals in the probl...