Lagrange interpolation of the translation operator in the three-dimensional multilevel fast multipole algorithm (MLFMA) is revisited. Parameters of the interpolation, namely, the number of interpolation points and the oversampling factor, are optimized for controllable error. Via optimization, it becomes possible to obtain the desired level of accuracy with the minimum processing time. © 2006 IEEE
Novel formulas are presented that allow the rapid estimation of the number of terms L that needs to ...
We present an overview of the Fast Multipole Method, explain the use of optimal data structures and...
Abstract—The multilevel fast multipole algorithm (MLFMA) is used in computing acoustic and electroma...
Cataloged from PDF version of article.Lagrange interpolation of the translation operator in the thr...
Lagrange interpolation of the translation operator in the three-dimensional multilevel fast multipol...
In this paper the Lagrange interpolation employed in the multilevel fast multipole algorithm (MLFMA)...
Cataloged from PDF version of article.We present a two-step Lagrange interpolation method for the ef...
We present a two-step Lagrange interpolation method for the efficient solution of large-scale electr...
We present an efficient technique to reduce the interpolation and anterpolation (transpose interpola...
Cataloged from PDF version of article.We present an efficient technique to reduce the interpolation ...
This paper investigates the parallel, distributed-memory computation of the translation operator wit...
We propose a novel algorithm for the parallel, distributed-memory computation of the translation ope...
We examine the practical implementation of a fast multipole method algorithm for the rapid summation...
This paper presents an extension of a new approach to select the truncation number for translation o...
We present a new error control method that provides the truncation numbers as well as the required d...
Novel formulas are presented that allow the rapid estimation of the number of terms L that needs to ...
We present an overview of the Fast Multipole Method, explain the use of optimal data structures and...
Abstract—The multilevel fast multipole algorithm (MLFMA) is used in computing acoustic and electroma...
Cataloged from PDF version of article.Lagrange interpolation of the translation operator in the thr...
Lagrange interpolation of the translation operator in the three-dimensional multilevel fast multipol...
In this paper the Lagrange interpolation employed in the multilevel fast multipole algorithm (MLFMA)...
Cataloged from PDF version of article.We present a two-step Lagrange interpolation method for the ef...
We present a two-step Lagrange interpolation method for the efficient solution of large-scale electr...
We present an efficient technique to reduce the interpolation and anterpolation (transpose interpola...
Cataloged from PDF version of article.We present an efficient technique to reduce the interpolation ...
This paper investigates the parallel, distributed-memory computation of the translation operator wit...
We propose a novel algorithm for the parallel, distributed-memory computation of the translation ope...
We examine the practical implementation of a fast multipole method algorithm for the rapid summation...
This paper presents an extension of a new approach to select the truncation number for translation o...
We present a new error control method that provides the truncation numbers as well as the required d...
Novel formulas are presented that allow the rapid estimation of the number of terms L that needs to ...
We present an overview of the Fast Multipole Method, explain the use of optimal data structures and...
Abstract—The multilevel fast multipole algorithm (MLFMA) is used in computing acoustic and electroma...