The solution of many problems in engineering and science is enabled by the availability of a fast algorithm, a significant example being the fast Fourier transform, which computes the matrix-vector product for a $N \times N$ Fourier matrix in $O(N\log(N))$ time. Related fast algorithms have been devised since to evaluate matrix-vector products for other structured matrices such as matrices with Toeplitz, Hankel, Vandermonde, etc. structure. A recent fast algorithm that was developed is the fast multipole method (FMM). The original FMM evaluates all pair-wise interactions in large ensembles of $N$ particles in $O(p^2N)$ time, where $p$ is the number of terms in the truncated multipole/local expansions it uses. Analytical properties of trans...
We present an overview of the Fast Multipole Method, explain the use of optimal data structures and...
We are interested in this manuscript in hierarchical methods for accelerating the resolution of line...
Diagonal translation operators form the core of the dynamic multilevel fast multipole algorithm (MLF...
We examine the practical implementation of a fast multipole method algorithm for the rapid summation...
Abstract. We present a matrix interpretation of the three-dimensional fast multipole method (FMM). T...
The Pascal matrix arises in a number of applications. We present a few ways to decompose the Pascal...
The author reviews the Fast Multipole Method (FMM) for solving the Coulom- bic potential problem. An...
The aim of this paper is a short introduction to a fundamental algorithm for the fast multiplication...
The evaluation of sums (matrix-vector products) of the solutions of the three-dimensional biharmon...
The fast multipole method (FMM) is an efficient algorithm for calculating electrostatic interactions...
Many problems in mathematical physics and engineering involve solving linear systems Ax = b which ar...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1998.Includes bibliogr...
The fast multipole method (FMM) is an efficient method for evaluating matrix-vector products related...
Les techniques avancées pour l’approximation de rang faible des matrices sont des outils de réductio...
The diagonalization of the translation matrix is crucial in reducing the solution time in the fast m...
We present an overview of the Fast Multipole Method, explain the use of optimal data structures and...
We are interested in this manuscript in hierarchical methods for accelerating the resolution of line...
Diagonal translation operators form the core of the dynamic multilevel fast multipole algorithm (MLF...
We examine the practical implementation of a fast multipole method algorithm for the rapid summation...
Abstract. We present a matrix interpretation of the three-dimensional fast multipole method (FMM). T...
The Pascal matrix arises in a number of applications. We present a few ways to decompose the Pascal...
The author reviews the Fast Multipole Method (FMM) for solving the Coulom- bic potential problem. An...
The aim of this paper is a short introduction to a fundamental algorithm for the fast multiplication...
The evaluation of sums (matrix-vector products) of the solutions of the three-dimensional biharmon...
The fast multipole method (FMM) is an efficient algorithm for calculating electrostatic interactions...
Many problems in mathematical physics and engineering involve solving linear systems Ax = b which ar...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1998.Includes bibliogr...
The fast multipole method (FMM) is an efficient method for evaluating matrix-vector products related...
Les techniques avancées pour l’approximation de rang faible des matrices sont des outils de réductio...
The diagonalization of the translation matrix is crucial in reducing the solution time in the fast m...
We present an overview of the Fast Multipole Method, explain the use of optimal data structures and...
We are interested in this manuscript in hierarchical methods for accelerating the resolution of line...
Diagonal translation operators form the core of the dynamic multilevel fast multipole algorithm (MLF...