Fast algorithms for potential evaluation in N-body problems often tend to be extremely abstract and complex. This thesis presents a simple, hierarchical approach to solving the potential evaluation problem in O(n) time. The approach is developed in the field of electrostatics and can be extended to N-body problems in general. Herein, the potential vector is expressed as a product of the potential matrix and the charge vector. The potential matrix itself is a product of component matrices. The potential function satisfies the Laplace equation and is hence expressed as a linear combination of spherical harmonics, which form the general solutions of the Laplace equation. The orthogonality of the spherical harmonics is exploited to reduce execu...
The fast multipole method is an algorithm first developed to approximately solve the N-body problem ...
This article introduces a novel approach to increase the performances of N-body simulations. In an N...
The N-body problem appears in many computational physics simulations. At each time step the computat...
N-body problems encompass a variety of fields such as electrostatics, molecularbiology and astrophys...
AbstractThis paper describes some new techniques for the rapid evaluation and fitting of radial basi...
AbstractThis paper presents a parallel version of the fast multipole method (FMM). The FMM is a rece...
Evaluating the energy of a system of N bodies interacting via a pairwise potential is naïvely an O(N...
In the wake of the Big Data phenomenon, the computing world has seen a number of computational parad...
N-body pairwise interactions are ubiquitous in scientific areas such as astrophysics, fluids mechani...
This thesis presents a top to bottom analysis on designing and implementing fast algorithms for curr...
The author reviews the Fast Multipole Method (FMM) for solving the Coulom- bic potential problem. An...
Solving an N-body problem, electrostatic or gravitational, is a crucial task and the main computatio...
We describe the design of several portable and efficient parallel implementations of adaptive N-body...
Numerical methods for solving the heat equation via potential theory have been hampered by the high ...
This work compares three algorithms for the three dimensional N-body problem, the Barnes-Hut algorit...
The fast multipole method is an algorithm first developed to approximately solve the N-body problem ...
This article introduces a novel approach to increase the performances of N-body simulations. In an N...
The N-body problem appears in many computational physics simulations. At each time step the computat...
N-body problems encompass a variety of fields such as electrostatics, molecularbiology and astrophys...
AbstractThis paper describes some new techniques for the rapid evaluation and fitting of radial basi...
AbstractThis paper presents a parallel version of the fast multipole method (FMM). The FMM is a rece...
Evaluating the energy of a system of N bodies interacting via a pairwise potential is naïvely an O(N...
In the wake of the Big Data phenomenon, the computing world has seen a number of computational parad...
N-body pairwise interactions are ubiquitous in scientific areas such as astrophysics, fluids mechani...
This thesis presents a top to bottom analysis on designing and implementing fast algorithms for curr...
The author reviews the Fast Multipole Method (FMM) for solving the Coulom- bic potential problem. An...
Solving an N-body problem, electrostatic or gravitational, is a crucial task and the main computatio...
We describe the design of several portable and efficient parallel implementations of adaptive N-body...
Numerical methods for solving the heat equation via potential theory have been hampered by the high ...
This work compares three algorithms for the three dimensional N-body problem, the Barnes-Hut algorit...
The fast multipole method is an algorithm first developed to approximately solve the N-body problem ...
This article introduces a novel approach to increase the performances of N-body simulations. In an N...
The N-body problem appears in many computational physics simulations. At each time step the computat...