The Fast Multipole Method (FMM) is well known to possess a bottleneck arising from decreasing workload on higher levels of the FMM tree [Greengard and Gropp, Comp. Math. Appl., 20(7), 1990]. We show that this potential bottleneck can be eliminated by overlapping multipole and local expansion computations with direct kernel evaluations on the finest level grid. Key words: fast multipole method, order-N algorithms, hierarchical algorithms
We present parallel versions of a representative N-body application that uses Greengard and Rokhlin&...
We present efficient algorithms to build data structures and the lists needed for fast multipole met...
We present new analysis, algorithmic techniques, and implementations of the Fast Multipole Method (F...
<p>Illustration of the components in a fast multipole method (FMM), with the upward sweep depicted o...
Among the algorithms that are likely to play a major role in future exascale computing, the fast mul...
<p>Illustration of the components in a fast multipole method (FMM), with the upward sweep depicted o...
The Fast Multipole Method allows the rapid evaluation of sums of radial basis functions centered at ...
In the parallel multilevel fast multipole algorithm (MLFMA), there exist two fundamental partitionin...
The fast multipole method is an algorithm first developed to approximately solve the N-body problem ...
Cataloged from PDF version of article.Due to its O(NlogN) complexity, the multilevel fast multipole ...
<b>Invited Lecture at the SIAM <i>"Encuentro Nacional de Ingeniería Matemática,"</i> at Pontificia U...
We present a novel hierarchical partitioning strategy for the efficient parallelization of the multi...
A new approach is proposed to enhance the efficiency and reduce the memory requirements of the multi...
The Fast Multipole Method allows the rapid evaluation of sums of radial basis functions centered at ...
A hierarchical parallelisation of the multilevel fast multipole algorithm (MLFMA) for the efficient ...
We present parallel versions of a representative N-body application that uses Greengard and Rokhlin&...
We present efficient algorithms to build data structures and the lists needed for fast multipole met...
We present new analysis, algorithmic techniques, and implementations of the Fast Multipole Method (F...
<p>Illustration of the components in a fast multipole method (FMM), with the upward sweep depicted o...
Among the algorithms that are likely to play a major role in future exascale computing, the fast mul...
<p>Illustration of the components in a fast multipole method (FMM), with the upward sweep depicted o...
The Fast Multipole Method allows the rapid evaluation of sums of radial basis functions centered at ...
In the parallel multilevel fast multipole algorithm (MLFMA), there exist two fundamental partitionin...
The fast multipole method is an algorithm first developed to approximately solve the N-body problem ...
Cataloged from PDF version of article.Due to its O(NlogN) complexity, the multilevel fast multipole ...
<b>Invited Lecture at the SIAM <i>"Encuentro Nacional de Ingeniería Matemática,"</i> at Pontificia U...
We present a novel hierarchical partitioning strategy for the efficient parallelization of the multi...
A new approach is proposed to enhance the efficiency and reduce the memory requirements of the multi...
The Fast Multipole Method allows the rapid evaluation of sums of radial basis functions centered at ...
A hierarchical parallelisation of the multilevel fast multipole algorithm (MLFMA) for the efficient ...
We present parallel versions of a representative N-body application that uses Greengard and Rokhlin&...
We present efficient algorithms to build data structures and the lists needed for fast multipole met...
We present new analysis, algorithmic techniques, and implementations of the Fast Multipole Method (F...