Abstract: The non-stationary nonlinear Navier-Stokes equations describe the motion of a viscous incompressible fluid flow for 0 < t 6 T in some bounded three-dimensional domain. Up to now it is not known wether these equations are well-posed or not. Therefore we use a particle method to develop a system of approximate equations. We show that this system can be solved uniquely and globally in time and that its solution has a high degree of spatial regularity. Moreover we prove that the system of approximate solutions has an accumulation point satisfying the Navier-Stokes equations in a weak sense. Key–Words: Navier-Stokes approximation, weak solutions, compatibility conditio
Many interesting problems arise from the study of the behavior of fluids. From a theoretical point o...
In this paper we consider the role that numerical computations-in particular Galerkin approximations...
We give a rather short and self contained presentation of the global existence results for Leray-Hop...
Abstract: The motion of a viscous incompressible fluid flow in bounded domains with a smooth boundar...
The present work is concerned with the solution of stationary Stokes and Navier-Stokes flows using t...
The present work is concerned with the solution of stationary Stokes and Navier-Stokes flows using t...
This volume is devoted to the study of the Navier–Stokes equations, providing a comprehensive refere...
The paper is concerned with the IBVP of the Navier–Stokes equations. The goal is the construction o...
A class of conditions sufficient for local regularity of suitable weak solutions of the non-stationa...
summary:The paper contains the proof of global existence of weak solutions to the mixed initial-boun...
. In this paper we prove that an operator which projects weak solutions of the two- or three-dimensi...
We study the approximation by means of an iterative method towards strong (and more regular) solutio...
We prove that the limits of the semi-discrete and the discrete semi-implicit Euler schemes for the 3...
We give a simple proof of the uniqueness of fluid particle trajectories corresponding to (1) the sol...
In their 2006 paper, Chernyshenko et al. [J. Math. Phys., 48 (2007), 065204, 15 pp]. prove that a su...
Many interesting problems arise from the study of the behavior of fluids. From a theoretical point o...
In this paper we consider the role that numerical computations-in particular Galerkin approximations...
We give a rather short and self contained presentation of the global existence results for Leray-Hop...
Abstract: The motion of a viscous incompressible fluid flow in bounded domains with a smooth boundar...
The present work is concerned with the solution of stationary Stokes and Navier-Stokes flows using t...
The present work is concerned with the solution of stationary Stokes and Navier-Stokes flows using t...
This volume is devoted to the study of the Navier–Stokes equations, providing a comprehensive refere...
The paper is concerned with the IBVP of the Navier–Stokes equations. The goal is the construction o...
A class of conditions sufficient for local regularity of suitable weak solutions of the non-stationa...
summary:The paper contains the proof of global existence of weak solutions to the mixed initial-boun...
. In this paper we prove that an operator which projects weak solutions of the two- or three-dimensi...
We study the approximation by means of an iterative method towards strong (and more regular) solutio...
We prove that the limits of the semi-discrete and the discrete semi-implicit Euler schemes for the 3...
We give a simple proof of the uniqueness of fluid particle trajectories corresponding to (1) the sol...
In their 2006 paper, Chernyshenko et al. [J. Math. Phys., 48 (2007), 065204, 15 pp]. prove that a su...
Many interesting problems arise from the study of the behavior of fluids. From a theoretical point o...
In this paper we consider the role that numerical computations-in particular Galerkin approximations...
We give a rather short and self contained presentation of the global existence results for Leray-Hop...