In a number of problems in computational physics, a finite sum of kernel functions centered at N particle locations located in a box in three dimensions must be extended by imposing periodic boundary conditions on box boundaries. Even though the finite sum can be efficiently computed via fast summa-tion algorithms, such as the fast multipole method (FMM), the periodized extension is usually treated via a different algorithm, Ewald summation, accelerated via the fast Fourier transform (FFT). A differ-ent approach to compute this periodized sum just using a blackbox finite fast summation algorithm is presented in this paper. The method splits the periodized sum in to two parts. The first, comprising the contribution of all points outside a la...
We present an efficient method to compute the electrostatic fields, torques and forces in dipolar sy...
The computation of the Coulomb potentials and forces in charged particle systems under 3d-periodic b...
We address periodic-image errors arising from the use of periodic boundary conditions to describe sy...
In a number of problems in computational physics, a finite sum of kernel functions centered at N par...
A unified treatment for the fast and spectrally accurate evaluation of electrostatic potentials with...
In this thesis, we present a fast multipole algorithm (FMA) for solving a periodic scattering proble...
The simulation of pairwise interactions in huge particle ensembles is a vital issue in scientific re...
The present thesis is dedicated to the efficient computation of electrostatic interactions in partic...
This thesis deals with fast and efficient methods for electrostatic calculations with application in...
Applications in electrostatics, magnetostatics, fluid mechanics, and elasticity often involve source...
The fast multipole method (FMM) is an efficient algorithm for calculating electrostatic interactions...
We present three new families of fast algorithms for classical potential theory, based on Ewald summ...
The polynomial or trigonometric interpolant of an arbitrary function f(x) may be represented as a “c...
The computation of the Coulomb potentials and forces in charged particle systems under 3d-periodic b...
A new and efficient algorithm based on multipole techniques is presented which calculates the electr...
We present an efficient method to compute the electrostatic fields, torques and forces in dipolar sy...
The computation of the Coulomb potentials and forces in charged particle systems under 3d-periodic b...
We address periodic-image errors arising from the use of periodic boundary conditions to describe sy...
In a number of problems in computational physics, a finite sum of kernel functions centered at N par...
A unified treatment for the fast and spectrally accurate evaluation of electrostatic potentials with...
In this thesis, we present a fast multipole algorithm (FMA) for solving a periodic scattering proble...
The simulation of pairwise interactions in huge particle ensembles is a vital issue in scientific re...
The present thesis is dedicated to the efficient computation of electrostatic interactions in partic...
This thesis deals with fast and efficient methods for electrostatic calculations with application in...
Applications in electrostatics, magnetostatics, fluid mechanics, and elasticity often involve source...
The fast multipole method (FMM) is an efficient algorithm for calculating electrostatic interactions...
We present three new families of fast algorithms for classical potential theory, based on Ewald summ...
The polynomial or trigonometric interpolant of an arbitrary function f(x) may be represented as a “c...
The computation of the Coulomb potentials and forces in charged particle systems under 3d-periodic b...
A new and efficient algorithm based on multipole techniques is presented which calculates the electr...
We present an efficient method to compute the electrostatic fields, torques and forces in dipolar sy...
The computation of the Coulomb potentials and forces in charged particle systems under 3d-periodic b...
We address periodic-image errors arising from the use of periodic boundary conditions to describe sy...