We present an algorithm that solves the three-dimensional Poisson equation on a cylindrical grid. The technique uses a finite-difference scheme with operator splitting. This splitting maps the banded structure of the operator matrix into a two-dimensional set of tridiagonal matrices, which are then solved in parallel. Our algorithm couples FFT techniques with the well-known ADI (Alternating Direction Implicit) method for solving Elliptic PDE's, and the implementation is extremely well suited for a massively parallel environment like the SIMD architecture of the MasPar MP-1. Due to the highly recursive nature of our problem, we believe that our method is highly efficient, as it avoids excessive interprocessor communication
Through the work proposed in this document we expect to advance the forefront of large scale computa...
This paper presents a strategy to accelerate virtually any Poisson solver by taking advantage of s s...
A key ingredient in the simulation of self-gravitating astrophysical fluid dynamical systems is the ...
We present results of three-dimensional, hydrodynamic models of gaseous disks settling in a nonspher...
We present a new multigrid scheme for solving the Poisson equation with Dirichlet boundary condition...
AbstractThe Navier-Stokes equations describe a large class of fluid flows but are difficult to solve...
A method for generating three dimensional, finite difference grids about complicated geometries by u...
We present a new multigrid scheme for solving the Poisson equation with Dirichlet boundary condition...
In this paper developed and realized absolutely new algorithm for solving three-dimensional Poisson ...
AbstractIn this paper we explored parallelization of PPE (pressure Poisson equation) solvers with th...
This dissertation addresses the need for an accurate and efficient technique which solves the Poisso...
Distributed-memory parallel computers dominate today's parallel computing arena. These machines, suc...
In this paper we propose and evaluate a set of new strategies for the solution of three dimensional ...
The Navier-Stokes equations describe a large class of fluid flows but are difficult to solve analyti...
This work is devoted to the development of efficient parallel algorithms for the direct numerical si...
Through the work proposed in this document we expect to advance the forefront of large scale computa...
This paper presents a strategy to accelerate virtually any Poisson solver by taking advantage of s s...
A key ingredient in the simulation of self-gravitating astrophysical fluid dynamical systems is the ...
We present results of three-dimensional, hydrodynamic models of gaseous disks settling in a nonspher...
We present a new multigrid scheme for solving the Poisson equation with Dirichlet boundary condition...
AbstractThe Navier-Stokes equations describe a large class of fluid flows but are difficult to solve...
A method for generating three dimensional, finite difference grids about complicated geometries by u...
We present a new multigrid scheme for solving the Poisson equation with Dirichlet boundary condition...
In this paper developed and realized absolutely new algorithm for solving three-dimensional Poisson ...
AbstractIn this paper we explored parallelization of PPE (pressure Poisson equation) solvers with th...
This dissertation addresses the need for an accurate and efficient technique which solves the Poisso...
Distributed-memory parallel computers dominate today's parallel computing arena. These machines, suc...
In this paper we propose and evaluate a set of new strategies for the solution of three dimensional ...
The Navier-Stokes equations describe a large class of fluid flows but are difficult to solve analyti...
This work is devoted to the development of efficient parallel algorithms for the direct numerical si...
Through the work proposed in this document we expect to advance the forefront of large scale computa...
This paper presents a strategy to accelerate virtually any Poisson solver by taking advantage of s s...
A key ingredient in the simulation of self-gravitating astrophysical fluid dynamical systems is the ...