Conselho Nacional de Desenvolvimento Científico e Tecnológico (CNPq)Complementing a previous comparative study of the accuracy of the fundamental mesh structures for primitive variable computations of incompressible fluid flows, this article considers some alternative approaches to the closure of the pressure equations in the boundary nodes of the vertex collocated mesh. In the previous study, these boundary pressures were determined directly by a discretized Poisson equation; in the present article the pressure equations at these nodes are derived from specific continuity equations, obtained by mass balance on the half-cells and by unilateral parabolic approximation of the velocity component normal to the wall. The first approach reduces t...
A velocity–pressure algorithm, in primitive variables and finite differences, is developed for incom...
A basic objective in computational fluid dynamics is the efficient solution of nonlinear systems of ...
The inviscid incompressible Euler equations are applied to a wide range of engineering applications....
Abstract: The paper deals with predictor-corrector method for Navier-Stokes equations usin...
Selecting compute nodes and solution grid generation are the first steps of numerical solutions. The...
The accuracies of the staggered, semistaggered, vertex collocated, and cell-center collocated meshes...
In the aspect of numerical methods for incompressible flow problems, there are two different algorit...
This article presents a novel implicit cell center finite volume scheme for solving two-dimensional ...
This paper describes discretization of transport equations on unstructured meshes with cell-centered...
Three numerical approaches for solving the incompressible Navier–Stokes equations in primitive varia...
A velocity–pressure algorithm, in primitive variables and finite differences, is developed for incom...
A pressure-based algorithm for incompressible flows is presented. The algorithm employs a finite-vol...
An explicit staggered projection method for the incompressible Navier-Stokes equations with no-slip ...
Two numerical issues important to proper problem specification for pressure-based algorithms are inv...
A velocity–pressure algorithm, in primitive variables and finite differences, is developed for incom...
A basic objective in computational fluid dynamics is the efficient solution of nonlinear systems of ...
The inviscid incompressible Euler equations are applied to a wide range of engineering applications....
Abstract: The paper deals with predictor-corrector method for Navier-Stokes equations usin...
Selecting compute nodes and solution grid generation are the first steps of numerical solutions. The...
The accuracies of the staggered, semistaggered, vertex collocated, and cell-center collocated meshes...
In the aspect of numerical methods for incompressible flow problems, there are two different algorit...
This article presents a novel implicit cell center finite volume scheme for solving two-dimensional ...
This paper describes discretization of transport equations on unstructured meshes with cell-centered...
Three numerical approaches for solving the incompressible Navier–Stokes equations in primitive varia...
A velocity–pressure algorithm, in primitive variables and finite differences, is developed for incom...
A pressure-based algorithm for incompressible flows is presented. The algorithm employs a finite-vol...
An explicit staggered projection method for the incompressible Navier-Stokes equations with no-slip ...
Two numerical issues important to proper problem specification for pressure-based algorithms are inv...
A velocity–pressure algorithm, in primitive variables and finite differences, is developed for incom...
A basic objective in computational fluid dynamics is the efficient solution of nonlinear systems of ...
The inviscid incompressible Euler equations are applied to a wide range of engineering applications....