A number of computational techniques are described that reduce the effort related to the continuous fast multipole method, used for the evaluation of Coulomb matrix elements as needed in Hartree-Fock and density functional theories. A new extent definition for Gaussian charge distributions is proposed, as well as a new way of dividing distributions into branches. Also, a new approach for estimating the error caused by truncation of multipole expansions is presented. It is found that the use of dynamically truncated multipole expansions gives a speedup of a factor of 10 in the work required for multipole interactions, compared to the case when all interactions are computed using a fixed multipole expansion order. Results of benchmark calcula...
We study integral methods applied to the resolution of the Maxwell equations where the linear system...
The fast multipole method is an algorithm first developed to approximately solve the N-body problem ...
AbstractThis paper presents a parallel version of the fast multipole method (FMM). The FMM is a rece...
We introduce the continuous fast multipole method (CFMM), a generalization of the fast multipole met...
This thesis describes the Fast Multipole Method (FMM). The method reduces the complexity of the Coul...
We present a numerical method to efficiently and accurately recompute the Coulomb potential of a lar...
Evaluating the energy of a system of N bodies interacting via a pairwise potential is naïvely an O(N...
This program has been imported from the CPC Program Library held at Queen's University Belfast (1969...
A number of physics problems can be modeled by a set of N elements which have pair-wise interactions...
The density functional package DeFT is used for systems with a large number of charge distributions,...
A number of physics problems may be cast in terms of Hilbert-Schmidt integral equations. In many cas...
Abstract. A version of the fast multipole method (FMM) is described for charge distributions on the ...
A new method for the multipole evaluation of contracted Cartesian Gaussian-based electron repulsion ...
Abstract. We present a matrix interpretation of the three-dimensional fast multipole method (FMM). T...
For more than two decades, several forms of fast multipole methods have been extremely successful in...
We study integral methods applied to the resolution of the Maxwell equations where the linear system...
The fast multipole method is an algorithm first developed to approximately solve the N-body problem ...
AbstractThis paper presents a parallel version of the fast multipole method (FMM). The FMM is a rece...
We introduce the continuous fast multipole method (CFMM), a generalization of the fast multipole met...
This thesis describes the Fast Multipole Method (FMM). The method reduces the complexity of the Coul...
We present a numerical method to efficiently and accurately recompute the Coulomb potential of a lar...
Evaluating the energy of a system of N bodies interacting via a pairwise potential is naïvely an O(N...
This program has been imported from the CPC Program Library held at Queen's University Belfast (1969...
A number of physics problems can be modeled by a set of N elements which have pair-wise interactions...
The density functional package DeFT is used for systems with a large number of charge distributions,...
A number of physics problems may be cast in terms of Hilbert-Schmidt integral equations. In many cas...
Abstract. A version of the fast multipole method (FMM) is described for charge distributions on the ...
A new method for the multipole evaluation of contracted Cartesian Gaussian-based electron repulsion ...
Abstract. We present a matrix interpretation of the three-dimensional fast multipole method (FMM). T...
For more than two decades, several forms of fast multipole methods have been extremely successful in...
We study integral methods applied to the resolution of the Maxwell equations where the linear system...
The fast multipole method is an algorithm first developed to approximately solve the N-body problem ...
AbstractThis paper presents a parallel version of the fast multipole method (FMM). The FMM is a rece...