Abstract. The fast Gauss transform proposed by Greengard and Strain reduces the computational complexity of the evaluation of the sum of N Gaussians at M points in d dimensions from O(MN) to O(M + N). However, the constant factor in O(M + N) grows exponentially with increasing dimensionality d, which makes the algorithm impractical in higher dimensions. In this paper we present an improved fast Gauss transform where the constant factor is reduced to asymptotically polynomial order. The reduction is based on a new multivariate Taylor expansion scheme combined with the space subdivision using the k-center algorithm. The complexity analysis and error bound are presented which helps to determine parameters automatically given a desired precisio...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1998.Includes bibliogr...
Fast algorithms for unequally spaced discrete Laplace transforms are presented. The algorithms are a...
We propose a fast variant of the Gaussian algorithm for the reduction of two dimensional lattices fo...
The fast Gauss transform proposed by Greengard and Strain reduces the computational complexity of t...
Evaluating sums of multivariate Gaussian kernels is a key computational task in many problems in com...
Evaluating sums of multivariate Gaussian kernels is a key computational task in many problems in com...
Abstract. The fast Gauss transform allows for the calculation of the sum of N Gaussians at M points ...
A new version of the fast Gauss transform (FGT) is introduced which is based on a truncated Chebyshe...
We present a novel approach for the fast approximation of the discrete Gauss transform in higher dim...
The fast Gauss transform of L. Greengard and J. Strain [SIAM J. Sci. Statist. Comput., 12 (1991), pp...
We construct a fast algorithm for the computation of discrete Gauss transforms with complex paramete...
In previous work we presented an efficient approach to computing ker-nel summations which arise in m...
Many machine learning algorithms require the summation of Gaussian kernel functions, an expensive op...
We present three new families of fast algorithms for classical potential theory, based on Ewald summ...
AbstractOver the past decade, the radial basis function method has been shown to produce high qualit...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1998.Includes bibliogr...
Fast algorithms for unequally spaced discrete Laplace transforms are presented. The algorithms are a...
We propose a fast variant of the Gaussian algorithm for the reduction of two dimensional lattices fo...
The fast Gauss transform proposed by Greengard and Strain reduces the computational complexity of t...
Evaluating sums of multivariate Gaussian kernels is a key computational task in many problems in com...
Evaluating sums of multivariate Gaussian kernels is a key computational task in many problems in com...
Abstract. The fast Gauss transform allows for the calculation of the sum of N Gaussians at M points ...
A new version of the fast Gauss transform (FGT) is introduced which is based on a truncated Chebyshe...
We present a novel approach for the fast approximation of the discrete Gauss transform in higher dim...
The fast Gauss transform of L. Greengard and J. Strain [SIAM J. Sci. Statist. Comput., 12 (1991), pp...
We construct a fast algorithm for the computation of discrete Gauss transforms with complex paramete...
In previous work we presented an efficient approach to computing ker-nel summations which arise in m...
Many machine learning algorithms require the summation of Gaussian kernel functions, an expensive op...
We present three new families of fast algorithms for classical potential theory, based on Ewald summ...
AbstractOver the past decade, the radial basis function method has been shown to produce high qualit...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1998.Includes bibliogr...
Fast algorithms for unequally spaced discrete Laplace transforms are presented. The algorithms are a...
We propose a fast variant of the Gaussian algorithm for the reduction of two dimensional lattices fo...