This work deals with discretizing viscous fluxes in the context of unstructured data based finite volume and meshless solvers, two competing methodologies for simulating viscous flows past complex industrial geometries. The two important requirements of a viscous discretization procedure are consistency and positivity. While consistency is a fundamental requirement, positivity is linked to the robustness of the solution methodology. The following advancements are made through this work within the finite volume and meshless frameworks. Finite Volume Method: Several viscous discretization procedures available in the literature are reviewed for: 1. ability to handle general grid elements 2. efficiency, particularly for 3D computations 3. cons...
A high-order scheme is examined an implemented in an unstructured solver. The motivation for this r...
International audienceThis article deals with the description and the validation of the unstructured...
The Navier-Stokes equations are solved numerically for two-dimensional steady viscous laminar flows....
peer reviewedA finite volume solver is presented in this paper and is designed for the computation o...
The Upwind-Least Squares Finite Difference (LSFD-U) scheme has been successfully applied for invisci...
This paper may be considered as a sequel to one of our earlier works pertaining to the development o...
High-order accurate methods have the potential to dramatically reduce the computational time needed ...
The effects of mesh regularity on the accuracy of unstructured node-centered finite-volume discretiz...
grantor: University of TorontoA finite-volume solver for the two-dimensional compressible ...
The goal of the present work is the development of a numerical method for compressible viscous flows...
We describe the implementation of a computational fluid dynamics solver for the simulation of high-s...
peer reviewedThis paper presents a finite volume solver for the computation of three-dimensional vis...
A Cartesian grid method has been developed for simulating two-dimensional unsteady, viscous, incompr...
Despite its numerical challenges, finite element method is used to compute viscous fluid flow. A con...
International audienceIn this article, we developed an unstructured fluid solver based on finite vol...
A high-order scheme is examined an implemented in an unstructured solver. The motivation for this r...
International audienceThis article deals with the description and the validation of the unstructured...
The Navier-Stokes equations are solved numerically for two-dimensional steady viscous laminar flows....
peer reviewedA finite volume solver is presented in this paper and is designed for the computation o...
The Upwind-Least Squares Finite Difference (LSFD-U) scheme has been successfully applied for invisci...
This paper may be considered as a sequel to one of our earlier works pertaining to the development o...
High-order accurate methods have the potential to dramatically reduce the computational time needed ...
The effects of mesh regularity on the accuracy of unstructured node-centered finite-volume discretiz...
grantor: University of TorontoA finite-volume solver for the two-dimensional compressible ...
The goal of the present work is the development of a numerical method for compressible viscous flows...
We describe the implementation of a computational fluid dynamics solver for the simulation of high-s...
peer reviewedThis paper presents a finite volume solver for the computation of three-dimensional vis...
A Cartesian grid method has been developed for simulating two-dimensional unsteady, viscous, incompr...
Despite its numerical challenges, finite element method is used to compute viscous fluid flow. A con...
International audienceIn this article, we developed an unstructured fluid solver based on finite vol...
A high-order scheme is examined an implemented in an unstructured solver. The motivation for this r...
International audienceThis article deals with the description and the validation of the unstructured...
The Navier-Stokes equations are solved numerically for two-dimensional steady viscous laminar flows....