The fast multipole method is an algorithm first developed to approximately solve the N-body problem in linear time. Part of the FMM involves recursively partitioning a region of source points into cells. Insight from studying lattices and covering problems leads to new, more efficient partitions for the FMM. New partitions are designed to reduce near-field and far-field calculations. Results from simulations show significant computation time reduction with little to no additional error in many cases.M.S
This work compares three algorithms for the three dimensional N-body problem, the Barnes-Hut algorit...
<b>Invited Lecture at the SIAM <i>"Encuentro Nacional de Ingeniería Matemática,"</i> at Pontificia U...
International audienceThe implementation of the near field part of the Fast Multipole Method, which ...
A number of physics problems can be modeled by a set of N elements which have pair-wise interactions...
This thesis describes the Fast Multipole Method (FMM). The method reduces the complexity of the Coul...
We present new analysis, algorithmic techniques, and implementations of the Fast Multipole Method (F...
Evaluating the energy of a system of N bodies interacting via a pairwise potential is naïvely an O(N...
We study integral methods applied to the resolution of the Maxwell equations where the linear system...
Simulation of N-particle systems with pairwise interactions is a very common prob- lem that occurs i...
AbstractThis paper presents a parallel version of the fast multipole method (FMM). The FMM is a rece...
The Fast Multipole Method (FMM) is well known to possess a bottleneck arising from decreasing worklo...
A number of physics problems may be cast in terms of Hilbert-Schmidt integral equations. In many cas...
A number of computational techniques are described that reduce the effort related to the continuous ...
Abstract. We present a matrix interpretation of the three-dimensional fast multipole method (FMM). T...
Abstract. This paper introduces a parallel directional fast multipole method (FMM) for solving N-bod...
This work compares three algorithms for the three dimensional N-body problem, the Barnes-Hut algorit...
<b>Invited Lecture at the SIAM <i>"Encuentro Nacional de Ingeniería Matemática,"</i> at Pontificia U...
International audienceThe implementation of the near field part of the Fast Multipole Method, which ...
A number of physics problems can be modeled by a set of N elements which have pair-wise interactions...
This thesis describes the Fast Multipole Method (FMM). The method reduces the complexity of the Coul...
We present new analysis, algorithmic techniques, and implementations of the Fast Multipole Method (F...
Evaluating the energy of a system of N bodies interacting via a pairwise potential is naïvely an O(N...
We study integral methods applied to the resolution of the Maxwell equations where the linear system...
Simulation of N-particle systems with pairwise interactions is a very common prob- lem that occurs i...
AbstractThis paper presents a parallel version of the fast multipole method (FMM). The FMM is a rece...
The Fast Multipole Method (FMM) is well known to possess a bottleneck arising from decreasing worklo...
A number of physics problems may be cast in terms of Hilbert-Schmidt integral equations. In many cas...
A number of computational techniques are described that reduce the effort related to the continuous ...
Abstract. We present a matrix interpretation of the three-dimensional fast multipole method (FMM). T...
Abstract. This paper introduces a parallel directional fast multipole method (FMM) for solving N-bod...
This work compares three algorithms for the three dimensional N-body problem, the Barnes-Hut algorit...
<b>Invited Lecture at the SIAM <i>"Encuentro Nacional de Ingeniería Matemática,"</i> at Pontificia U...
International audienceThe implementation of the near field part of the Fast Multipole Method, which ...