Add to ORKGA method for using domain decomposition to solve the equations of incompressible viscous flow is presented. The method is described in detail, and test results are given for two test problems. A notable feature of the method is that the incompressibility constraint is never imposed. The domain decomposition uses finite difference and spectral methods on overlapping domains, with second-order accurate interpolation of the velocity relating the solutions on the different domains. The method is shown to be globally second-order accurate by the test results
We develop an effective domain decomposition meshless methodology for conjugate heat transfer proble...
In this paper, we review some recent progress made in [4, 5, 6] on finite difference schemes for vis...
This thesis extends earlier research in numerical analysis and computational fluid dynamics (CFD) to...
We consider numerical approximations to the Navier-Stokes equations for viscous, incompressible flow...
We face the numerical solution of Navier-Stokes equations for compressible viscous flows in a two-di...
This paper describes a domain decomposition method for the incompressible Navier-Stokes equations in...
In the context of non overlapping domain decomposition methods, several algebraic approximations of ...
Abstract. A very simple and efficient finite element method is introduced for two and three dimensio...
Requirements to compute stationary flow patterns are often encountered. With progress of computer en...
Abstract: An artificial compressibility method is designed to simulate stationary two-and three-dime...
We present an overview of the most common numerical solution strategies for the incompressible Navie...
An artificial compressibility method is designed to simulate stationary two-and threedimensional mot...
We discuss the fictitious domain solution of the Navier-Stokes equations modeling unsteady incompres...
A non-overlapping domain decomposition method is presented to solve a coupled Stokes-Darcy flow prob...
We develop an effective domain decomposition meshless methodology for conjugate heat transfer proble...
We develop an effective domain decomposition meshless methodology for conjugate heat transfer proble...
In this paper, we review some recent progress made in [4, 5, 6] on finite difference schemes for vis...
This thesis extends earlier research in numerical analysis and computational fluid dynamics (CFD) to...
We consider numerical approximations to the Navier-Stokes equations for viscous, incompressible flow...
We face the numerical solution of Navier-Stokes equations for compressible viscous flows in a two-di...
This paper describes a domain decomposition method for the incompressible Navier-Stokes equations in...
In the context of non overlapping domain decomposition methods, several algebraic approximations of ...
Abstract. A very simple and efficient finite element method is introduced for two and three dimensio...
Requirements to compute stationary flow patterns are often encountered. With progress of computer en...
Abstract: An artificial compressibility method is designed to simulate stationary two-and three-dime...
We present an overview of the most common numerical solution strategies for the incompressible Navie...
An artificial compressibility method is designed to simulate stationary two-and threedimensional mot...
We discuss the fictitious domain solution of the Navier-Stokes equations modeling unsteady incompres...
A non-overlapping domain decomposition method is presented to solve a coupled Stokes-Darcy flow prob...
We develop an effective domain decomposition meshless methodology for conjugate heat transfer proble...
We develop an effective domain decomposition meshless methodology for conjugate heat transfer proble...
In this paper, we review some recent progress made in [4, 5, 6] on finite difference schemes for vis...
This thesis extends earlier research in numerical analysis and computational fluid dynamics (CFD) to...