The Upwind-Least Squares Finite Difference (LSFD-U) scheme has been successfully applied for inviscid flow computations. In the present work, we extend the procedure for computing viscous flows. Different ways of discretizing the viscous fluxes are analysed for the positivity, which determines the robustness of the solution procedure. The scheme which is found to be more positive is employed for viscous flux computation. The numerical results for validating the procedure are presented
An overview is given of new developments of the least squares finite element method (LSFEM) in fluid...
AbstractA dual-time implicit mesh-less scheme is developed for solution of governing viscous flow eq...
One of the important trends in the present day CFD research is the development of new class of flow ...
The Upwind-Least Squares Finite Difference (LSFD-U) scheme has been successfully applied for invisci...
This work deals with discretizing viscous fluxes in the context of unstructured data based finite vo...
This paper may be considered as a sequel to one of our earlier works pertaining to the development o...
In this paper, we present a new upwind finite difference scheme for meshless solvers. This new schem...
Most commercial computational fluid dynamics (CFD) packages available today are based on the finite ...
High-order accurate methods have the potential to dramatically reduce the computational time needed ...
peer reviewedA finite volume solver is presented in this paper and is designed for the computation o...
A new numerical method for solving the twodimensional, steady, incompressible, viscous flow equation...
A brief description of the work currently underway on hypersonic viscous flow computations, based on...
AbstractComparisons are made between various finite difference algorithms used for the numerical sol...
Four time-dependent numerical algorithms for the prediction of unsteady, viscous compressible flows ...
In this paper, we review some recent progress made in [4, 5, 6] on finite difference schemes for vis...
An overview is given of new developments of the least squares finite element method (LSFEM) in fluid...
AbstractA dual-time implicit mesh-less scheme is developed for solution of governing viscous flow eq...
One of the important trends in the present day CFD research is the development of new class of flow ...
The Upwind-Least Squares Finite Difference (LSFD-U) scheme has been successfully applied for invisci...
This work deals with discretizing viscous fluxes in the context of unstructured data based finite vo...
This paper may be considered as a sequel to one of our earlier works pertaining to the development o...
In this paper, we present a new upwind finite difference scheme for meshless solvers. This new schem...
Most commercial computational fluid dynamics (CFD) packages available today are based on the finite ...
High-order accurate methods have the potential to dramatically reduce the computational time needed ...
peer reviewedA finite volume solver is presented in this paper and is designed for the computation o...
A new numerical method for solving the twodimensional, steady, incompressible, viscous flow equation...
A brief description of the work currently underway on hypersonic viscous flow computations, based on...
AbstractComparisons are made between various finite difference algorithms used for the numerical sol...
Four time-dependent numerical algorithms for the prediction of unsteady, viscous compressible flows ...
In this paper, we review some recent progress made in [4, 5, 6] on finite difference schemes for vis...
An overview is given of new developments of the least squares finite element method (LSFEM) in fluid...
AbstractA dual-time implicit mesh-less scheme is developed for solution of governing viscous flow eq...
One of the important trends in the present day CFD research is the development of new class of flow ...