Kernel quadratures and other kernel-based approximation methods typically suffer from prohibitive cubic time and quadratic space complexity in the number of function evaluations. The problem arises because a system of linear equations needs to be solved. In this article we show that the weights of a kernel quadrature rule can be computed efficiently and exactly for up to tens of millions of nodes if the kernel, integration domain, and measure are fully symmetric and the node set is a union of fully symmetric sets. This is based on the observations that in such a setting there are only as many distinct weights as there are fully symmetric sets and that these weights can be solved from a linear system of equations constructed out of row sums ...
We consider a function g : ! n ! ! n for which the Jacobian is symmetric and sparse. Such functi...
Using extensions of linear algebra concepts to Reproducing Kernel Hilbert Spaces (RKHS), we define a...
Using extensions of linear algebra concepts to Reproducing Kernel Hilbert Spaces (RKHS), we define a...
Kernel quadratures and other kernel-based approximation methods typically suffer from prohibitive cu...
International audienceThe design of sparse quadratures for the approximation of integral operators r...
© 2018 Society for Industrial and Applied Mathematics. The design of sparse quadratures for the appr...
International audienceIn this paper, we consider two fundamental symmetric kernels in linear algebra...
We study kernel quadrature rules with convex weights. Our approach combines the spectral properties ...
Quadrature formulas for spheres, the rotation group, and other compact, homogeneous man-ifolds are i...
Abstract. We present a fast algorithm for kernel summation problems in high-dimensions. These proble...
This article derives an accurate, explicit, and numerically stable approximation to the kernel quadr...
This paper presents an algorithm for filter calculations using symmetric matrix kernels. This algori...
While classical kernel-based learning algorithms are based on a single kernel, in practice it is oft...
AbstractFor symmetric quadrature formulas, sharper error bounds are generated by a formulation of th...
While classical kernel-based learning algorithms are based on a single kernel, in practice it is oft...
We consider a function g : ! n ! ! n for which the Jacobian is symmetric and sparse. Such functi...
Using extensions of linear algebra concepts to Reproducing Kernel Hilbert Spaces (RKHS), we define a...
Using extensions of linear algebra concepts to Reproducing Kernel Hilbert Spaces (RKHS), we define a...
Kernel quadratures and other kernel-based approximation methods typically suffer from prohibitive cu...
International audienceThe design of sparse quadratures for the approximation of integral operators r...
© 2018 Society for Industrial and Applied Mathematics. The design of sparse quadratures for the appr...
International audienceIn this paper, we consider two fundamental symmetric kernels in linear algebra...
We study kernel quadrature rules with convex weights. Our approach combines the spectral properties ...
Quadrature formulas for spheres, the rotation group, and other compact, homogeneous man-ifolds are i...
Abstract. We present a fast algorithm for kernel summation problems in high-dimensions. These proble...
This article derives an accurate, explicit, and numerically stable approximation to the kernel quadr...
This paper presents an algorithm for filter calculations using symmetric matrix kernels. This algori...
While classical kernel-based learning algorithms are based on a single kernel, in practice it is oft...
AbstractFor symmetric quadrature formulas, sharper error bounds are generated by a formulation of th...
While classical kernel-based learning algorithms are based on a single kernel, in practice it is oft...
We consider a function g : ! n ! ! n for which the Jacobian is symmetric and sparse. Such functi...
Using extensions of linear algebra concepts to Reproducing Kernel Hilbert Spaces (RKHS), we define a...
Using extensions of linear algebra concepts to Reproducing Kernel Hilbert Spaces (RKHS), we define a...