Implicit finite difference schemes are often the preferred numerical schemes in computational fluid dynamics, requiring less stringent stability bounds than the explicit schemes. Each iteration in an implicit scheme involves global data dependencies in the form of second and higher order recurrences. Efficient parallel implementations of such iterative methods are considerably more difficult and non-intuitive. The parallelization of the implicit schemes that are used for solving the Euler and the thin layer Navier-Stokes equations and that require inversions of large linear systems in the form of block tri-diagonal and/or block penta-diagonal matrices is discussed. Three-dimensional cases are emphasized and schemes that minimize the total e...
Linearization of the non-linear systems arising from fully implicit schemes in computational fluid...
In the field of computational fluid dynamics, the Navier-Stokes equations are often solved using an ...
The Navier-Stokes equations are solved numerically for two-and three-dimensional viscous laminar flo...
A mesh-vertex finite volume scheme for solving the Euler equations on triangular unstructured meshes...
The development of implicit schemes for obtaining steady state solutions to the Euler and Navier-Sto...
Some existing parallel N-S codes, including both explicit and implicit algorithms, have been ported ...
This two-part paper presents the results of a benchmarked analytical-numerical investigation into th...
AbstractThe Navier-Stokes equations describe a large class of fluid flows but are difficult to solve...
AbstractWe present a numerical scheme geared for high performance computation of wall-bounded turbul...
Two implicit finite element formulations for incompressible flows have been implemented on the Conne...
A new parallel numerical scheme for solving incompressible steady-state flows is presented. The algo...
Element-by-element approximate factorization, implicit-explicit and adaptive implicit-explicit appro...
The paper describes two studies involved with the parallelisation of algorithms for the numerical c...
In this paper, we will be mainly concerned with a parallel algorithm (in time and space) which is us...
Implicit methods based on the Newton’s rootfinding algorithm are receiving an increasing attention f...
Linearization of the non-linear systems arising from fully implicit schemes in computational fluid...
In the field of computational fluid dynamics, the Navier-Stokes equations are often solved using an ...
The Navier-Stokes equations are solved numerically for two-and three-dimensional viscous laminar flo...
A mesh-vertex finite volume scheme for solving the Euler equations on triangular unstructured meshes...
The development of implicit schemes for obtaining steady state solutions to the Euler and Navier-Sto...
Some existing parallel N-S codes, including both explicit and implicit algorithms, have been ported ...
This two-part paper presents the results of a benchmarked analytical-numerical investigation into th...
AbstractThe Navier-Stokes equations describe a large class of fluid flows but are difficult to solve...
AbstractWe present a numerical scheme geared for high performance computation of wall-bounded turbul...
Two implicit finite element formulations for incompressible flows have been implemented on the Conne...
A new parallel numerical scheme for solving incompressible steady-state flows is presented. The algo...
Element-by-element approximate factorization, implicit-explicit and adaptive implicit-explicit appro...
The paper describes two studies involved with the parallelisation of algorithms for the numerical c...
In this paper, we will be mainly concerned with a parallel algorithm (in time and space) which is us...
Implicit methods based on the Newton’s rootfinding algorithm are receiving an increasing attention f...
Linearization of the non-linear systems arising from fully implicit schemes in computational fluid...
In the field of computational fluid dynamics, the Navier-Stokes equations are often solved using an ...
The Navier-Stokes equations are solved numerically for two-and three-dimensional viscous laminar flo...