. We describe the implementation of a fluid dynamical benchmark on the 256 node SUPRENUM-1 parallel computer. The benchmark, the Shallow Water Equations, is frequently used as a model for both oceanographic and atmospheric circulation. We describe the steps involved in implementing the algorithm on the SUPRENUM-1 and we provide details of performance. We have measured 4.95 Mflops (64-bit arithmetic) for single node performance, and 1200 Mflops aggregate performance with 256 nodes, at efficiencies up to 96%. This compares well with vector and MIMD supercomputers. Performance of 1530 Mflops was measured for the same algorithm on the CRAY YMP/8, and 543 Mflops was measured on the 128-node Intel iPSC/860. The SIMD Thinking Machines CM-200 deliv...
Summarization: We construct a parallel algorithm, suitable for distributed memory architectures, of ...
Advances in computational science are closely tied to developments in highperformance computing. We ...
Abstract — We address the speedup of the nume-rical solution of shallow water systems in 2D do-mains...
INTRODUCTION We have previously described the implementation of a fluid dynamical benchmark on the ...
(Keywords: shallow water modeling, GWC equation, finite elements) This report presents the results o...
In recent years, a number of computer vendors have produced supercomputers based on a massively para...
grantor: University of TorontoThe shallow-water equations are often used as a mathematical...
The shallow water equations in Cartesian coordinates and 2-D are solved on the Connection Machine 2 ...
The article of record as published may be found at http://dx.doi.org/10.1175/1520-0493(1993)121To im...
An energy- and enstrophy-conserving and optimally-dispersive numerical scheme for the shallow- water...
Here we report on development of a high order nite element code for the solution of the shallow wat...
This paper presents a GPU (Graphics Processing Unit)-accelerated and LTS (Local-time-Step)-based fin...
Shallow water equations or commonly referred as Saint-Venant equations are used to model fluid phen...
The goal of the SDSC effort described here is to evaluate the performance potential of the Oberhuber...
Shallow water test case to compare performance to Julia. Described in the paper: Julia for Geophysi...
Summarization: We construct a parallel algorithm, suitable for distributed memory architectures, of ...
Advances in computational science are closely tied to developments in highperformance computing. We ...
Abstract — We address the speedup of the nume-rical solution of shallow water systems in 2D do-mains...
INTRODUCTION We have previously described the implementation of a fluid dynamical benchmark on the ...
(Keywords: shallow water modeling, GWC equation, finite elements) This report presents the results o...
In recent years, a number of computer vendors have produced supercomputers based on a massively para...
grantor: University of TorontoThe shallow-water equations are often used as a mathematical...
The shallow water equations in Cartesian coordinates and 2-D are solved on the Connection Machine 2 ...
The article of record as published may be found at http://dx.doi.org/10.1175/1520-0493(1993)121To im...
An energy- and enstrophy-conserving and optimally-dispersive numerical scheme for the shallow- water...
Here we report on development of a high order nite element code for the solution of the shallow wat...
This paper presents a GPU (Graphics Processing Unit)-accelerated and LTS (Local-time-Step)-based fin...
Shallow water equations or commonly referred as Saint-Venant equations are used to model fluid phen...
The goal of the SDSC effort described here is to evaluate the performance potential of the Oberhuber...
Shallow water test case to compare performance to Julia. Described in the paper: Julia for Geophysi...
Summarization: We construct a parallel algorithm, suitable for distributed memory architectures, of ...
Advances in computational science are closely tied to developments in highperformance computing. We ...
Abstract — We address the speedup of the nume-rical solution of shallow water systems in 2D do-mains...