The numerical solution of wave scattering from large objects or from a large cluster of scatterers requires excessive computational resources and it becomes necessary to use approximate-but fast-methods such as the fast multipole method; however, since these methods are only approximate, it is important to have an estimate for the error introduced in such calculations. An analysis of the error for the fast multipole method is presented and estimates for truncation and numerical integration errors are obtained. The error caused by polynomial interpolation in a multilevel fast multipole algorithm is also analyzed. The total error introduced in a multilevel implementation is also investigated numerically
. Rapid evaluation of potentials in particle systems is an important, time-consuming step in many ph...
An estimator for the error in the wave number is presented in the context of finite element approxim...
The Multilevel Fast Multipole Algorithm (MLFMA) is a well known and very successful method for accel...
The matrix-vector multiplication encountered in the iterative solution of scattering problems can be...
Our aim is to implement an FMM (Fast Multipole Method) solver using the approach given by Chew [35] ...
AbstractDiscretisation of the integral equations of acoustic scattering yields large dense systems o...
Numerical study of the multipole expansion for the multilevel fast multipole algorithm (MLFMA) is pr...
We perform a complete study of the truncation error of the Gegenbauer series. This series yields a...
SIGLEAvailable from British Library Document Supply Centre-DSC:8723.3997(99-04) / BLDSC - British Li...
We perform a complete study of the truncation error of the Jacobi-Anger series. This series expand...
The fast inhomogeneous plane wave algorithm is another approach of the diagonal factorization of the...
The computational error of the multilevel fast multipole algorithm is studied. The error convergence...
The problem of determining the field scattered by a cluster of scatterers when they are insonified b...
The Method of Moments is a numerical technique for solving electromagnetic problems with integral eq...
Because of the widespread use of the Method of Moments for simulation of radiation and scattering pr...
. Rapid evaluation of potentials in particle systems is an important, time-consuming step in many ph...
An estimator for the error in the wave number is presented in the context of finite element approxim...
The Multilevel Fast Multipole Algorithm (MLFMA) is a well known and very successful method for accel...
The matrix-vector multiplication encountered in the iterative solution of scattering problems can be...
Our aim is to implement an FMM (Fast Multipole Method) solver using the approach given by Chew [35] ...
AbstractDiscretisation of the integral equations of acoustic scattering yields large dense systems o...
Numerical study of the multipole expansion for the multilevel fast multipole algorithm (MLFMA) is pr...
We perform a complete study of the truncation error of the Gegenbauer series. This series yields a...
SIGLEAvailable from British Library Document Supply Centre-DSC:8723.3997(99-04) / BLDSC - British Li...
We perform a complete study of the truncation error of the Jacobi-Anger series. This series expand...
The fast inhomogeneous plane wave algorithm is another approach of the diagonal factorization of the...
The computational error of the multilevel fast multipole algorithm is studied. The error convergence...
The problem of determining the field scattered by a cluster of scatterers when they are insonified b...
The Method of Moments is a numerical technique for solving electromagnetic problems with integral eq...
Because of the widespread use of the Method of Moments for simulation of radiation and scattering pr...
. Rapid evaluation of potentials in particle systems is an important, time-consuming step in many ph...
An estimator for the error in the wave number is presented in the context of finite element approxim...
The Multilevel Fast Multipole Algorithm (MLFMA) is a well known and very successful method for accel...