Solution of the implicitly discretised fluid flow equations by operator-splitting
Journal of Computational Physics
A new class of asynchronous iterative algorithms with order intervals
Mathematics of Computation
MPICH/Madeleine: a True Multi-Protocol MPI for High Performance Networks
IPDPS '01 Proceedings of the 15th International Parallel & Distributed Processing Symposium
BOINC: A System for Public-Resource Computing and Storage
GRID '04 Proceedings of the 5th IEEE/ACM International Workshop on Grid Computing
Some Solutions for Peer-to-Peer Global Computing
PDP '05 Proceedings of the 13th Euromicro Conference on Parallel, Distributed and Network-Based Processing
PDP '10 Proceedings of the 2010 18th Euromicro Conference on Parallel, Distributed and Network-based Processing
Asynchronous Peer-to-peer Distributed Computing for Financial Applications
IPDPSW '11 Proceedings of the 2011 IEEE International Symposium on Parallel and Distributed Processing Workshops and PhD Forum
| Hi-index | 0.00 |
In the present study we consider the parallel simulation on a peer-topeer demonstrator for the computation of a 3D differential equations, which model the behavior of the continuous-flow electrophoresis problem. The physical model considered is constituted by the Navier-Stokes equation coupled with a convection-diffusion equation and a Laplacian equation. By using appropriate discretization of the coupled boundary value problems, we can prove the convergence of synchronous and more generally asynchronous relaxation methods. Finally parallel experiments on the peer-to-peer demonstrator are presented and analyzed.