The solution of the governing steady transport equations for momentum, heat and mass transfer in flowing fluids can be very difficult. These difficulties arise from the nonlinear, coupled, nonsymmetric nature of the system of algebraic equations that results from spatial discretization of the PDEs. In this manuscript the authors focus on evaluating a proposed nonlinear solution method based on an inexact Newton method with backtracking. In this context they use a particular spatial discretization based on a pressure stabilized Petrov-Galerkin finite element formulation of the low Mach number Navier-Stokes equations with heat and mass transport. The discussion considers computational efficiency, robustness and some implementation issues rela...
In physics, the Navier-Stokes equations (NSE) describe Newtonian fluid flows. Instead of focusing on...
In this article we present numerical methods for the approximation of incompressible flows. We have ...
Abstract. The topic of this paper is motivated by the Navier–Stokes equations in rotation form. Line...
The finite element discretization of the incompressible steady-state Navier-Stokes equations yields ...
The present work deals with the nonlinear multiphysics advection-diffusion problem where non-station...
Abstract. In an earlier study of inexact Newton methods (JCP, 1997), we pointed out that certain cou...
This thesis describes a numerical method for computational fluid dynamics. Special attention is paid...
Fully coupled, Newton-Krylov algorithms are investigated for solving strongly coupled, nonlinear sys...
Purpose – The purpose of this paper is to describe a finite element formulation to approximate...
The stabilized finite element formulations based on the SUPG (Stream-line-Upwind/Petrov-Galerkin) an...
Abstract: New robust algorithm for numerical solution of Navier-Stokes equation in natural...
An effective approach is presented for the numerical solution of the equations governing steady lami...
In this work, a new algorithm for solving the Navier-Stokes equations in a coupled and implicit mann...
Abstract. With the use of the Newton method, a new numerical method previously published1 for solvin...
A basic objective in computational fluid dynamics is the efficient solution of nonlinear systems of ...
In physics, the Navier-Stokes equations (NSE) describe Newtonian fluid flows. Instead of focusing on...
In this article we present numerical methods for the approximation of incompressible flows. We have ...
Abstract. The topic of this paper is motivated by the Navier–Stokes equations in rotation form. Line...
The finite element discretization of the incompressible steady-state Navier-Stokes equations yields ...
The present work deals with the nonlinear multiphysics advection-diffusion problem where non-station...
Abstract. In an earlier study of inexact Newton methods (JCP, 1997), we pointed out that certain cou...
This thesis describes a numerical method for computational fluid dynamics. Special attention is paid...
Fully coupled, Newton-Krylov algorithms are investigated for solving strongly coupled, nonlinear sys...
Purpose – The purpose of this paper is to describe a finite element formulation to approximate...
The stabilized finite element formulations based on the SUPG (Stream-line-Upwind/Petrov-Galerkin) an...
Abstract: New robust algorithm for numerical solution of Navier-Stokes equation in natural...
An effective approach is presented for the numerical solution of the equations governing steady lami...
In this work, a new algorithm for solving the Navier-Stokes equations in a coupled and implicit mann...
Abstract. With the use of the Newton method, a new numerical method previously published1 for solvin...
A basic objective in computational fluid dynamics is the efficient solution of nonlinear systems of ...
In physics, the Navier-Stokes equations (NSE) describe Newtonian fluid flows. Instead of focusing on...
In this article we present numerical methods for the approximation of incompressible flows. We have ...
Abstract. The topic of this paper is motivated by the Navier–Stokes equations in rotation form. Line...