The fast multipole method (FMM) is an efficient algorithm for calculating electrostatic interactions in molecular simulations and a promising alternative to Ewald summation methods. Translation of multipole expansion in spherical harmonics is the most important operation of the fast multipole method and the fast Fourier transform (FFT) acceleration of this operation is among the fastest methods of improving its performance. The technique relies on highly optimized implementation of fast Fourier transform routines for the desired expansion sizes, which need to incorporate the knowledge of symmetries and zero elements in the input arrays. Here a method is presented for automatic generation of such, highly optimized, routines. Keywords fast mu...
The fast multipole method is an algorithm first developed to approximately solve the N-body problem ...
This paper proposes a compression of far field matrices in the fast multipole method and its multile...
For more than two decades, several forms of fast multipole methods have been extremely successful in...
Simulation of N-particle systems with pairwise interactions is a very common prob- lem that occurs i...
This thesis deals with fast and efficient methods for electrostatic calculations with application in...
10.1109/TCAD.2004.829798IEEE Transactions on Computer-Aided Design of Integrated Circuits and System...
Abstract. In this paper a method is presented how to perform interpolation and anterpolation in both...
10.1002/nme.1081International Journal for Numerical Methods in Engineering615633-656IJNM
The fast field calculation which is fundamentally different from the given techniques is presented. ...
Fast Multipole Methods (FMMs) based on the oscillatory Helmholtz kernel can reduce the cost of solvi...
The present thesis is dedicated to the efficient computation of electrostatic interactions in partic...
A number of computational techniques are described that reduce the effort related to the continuous ...
The polynomial or trigonometric interpolant of an arbitrary function f(x) may be represented as a “c...
A refinement for the computation of the rigorous part of the multi-level fast multipole method (MLFM...
Abstract. We present a matrix interpretation of the three-dimensional fast multipole method (FMM). T...
The fast multipole method is an algorithm first developed to approximately solve the N-body problem ...
This paper proposes a compression of far field matrices in the fast multipole method and its multile...
For more than two decades, several forms of fast multipole methods have been extremely successful in...
Simulation of N-particle systems with pairwise interactions is a very common prob- lem that occurs i...
This thesis deals with fast and efficient methods for electrostatic calculations with application in...
10.1109/TCAD.2004.829798IEEE Transactions on Computer-Aided Design of Integrated Circuits and System...
Abstract. In this paper a method is presented how to perform interpolation and anterpolation in both...
10.1002/nme.1081International Journal for Numerical Methods in Engineering615633-656IJNM
The fast field calculation which is fundamentally different from the given techniques is presented. ...
Fast Multipole Methods (FMMs) based on the oscillatory Helmholtz kernel can reduce the cost of solvi...
The present thesis is dedicated to the efficient computation of electrostatic interactions in partic...
A number of computational techniques are described that reduce the effort related to the continuous ...
The polynomial or trigonometric interpolant of an arbitrary function f(x) may be represented as a “c...
A refinement for the computation of the rigorous part of the multi-level fast multipole method (MLFM...
Abstract. We present a matrix interpretation of the three-dimensional fast multipole method (FMM). T...
The fast multipole method is an algorithm first developed to approximately solve the N-body problem ...
This paper proposes a compression of far field matrices in the fast multipole method and its multile...
For more than two decades, several forms of fast multipole methods have been extremely successful in...