Now showing items 1-5 of 5
Fast algorithms and parallel computing: solution of extremely large integral equations in computational electromagnetics
Accurate simulations of real-life electromagnetics problems with integral equations require the solution of dense matrix equations involving millions of unknowns. Solutions of these extremely large problems cannot be ...
Efficient parallelization of the multilevel fast multipole algorithm (MLFMA)
It is possible to solve electromagnetics problems several orders of magnitude faster by using MLFMA. Without exaggeration, this means accelerating the solutions by thousands or even millions of times, compared to the ...
Analysis of composite objects involving multiple dielectric and metallic partswith the parallel multilevel fast multipole algorithm
(Applied Computational Electromagnetics Society, 2012-04)