We study kernel quadrature rules with convex weights. Our approach combines the spectral properties of the kernel with recombination results about point measures. This results in effective algorithms that construct convex quadrature rules using only access to i.i.d. samples from the underlying measure and evaluation of the kernel and that result in a small worst-case error. In addition to our theoretical results and the benefits resulting from convex weights, our experiments indicate that this construction can compete with the optimal bounds in well-known examples
We present an algorithm based on convex optimization for constructing kernels for semi-supervised l...
Abstract. Fowlkes et al. [7] recently introduced an approximation to the Normalized Cut (NCut) group...
International audienceWe investigate evolution strategies with weighted recombi-nation on general co...
We study kernel quadrature rules with convex weights. Our approach combines the spectral properties ...
Regularized Kernel Discriminant Analysis (RKDA) performs linear discriminant analysis in the feature...
The kernel function plays a central role in kernel methods. In this paper, we consider the automated...
International audienceWe study quadrature rules for functions living in an RKHS, using nodes sampled...
International audienceThe design of sparse quadratures for the approximation of integral operators r...
Kernel quadratures and other kernel-based approximation methods typically suffer from prohibitive cu...
© 2018 Society for Industrial and Applied Mathematics. The design of sparse quadratures for the appr...
Regularized kernel discriminant analysis (RKDA) performs linear discriminant analysis in the fea-tur...
We derive new bounds on covering numbers for hypothesis classes generated by convex combinations of ...
This article reviews and studies the properties of Bayesian quadrature weights, which strongly affec...
International audienceWe study a quadrature, proposed by Ermakov and Zolotukhin in the sixties, thro...
In a recent paper we have introduced the class of realised kernel estimators of the increments of qu...
We present an algorithm based on convex optimization for constructing kernels for semi-supervised l...
Abstract. Fowlkes et al. [7] recently introduced an approximation to the Normalized Cut (NCut) group...
International audienceWe investigate evolution strategies with weighted recombi-nation on general co...
We study kernel quadrature rules with convex weights. Our approach combines the spectral properties ...
Regularized Kernel Discriminant Analysis (RKDA) performs linear discriminant analysis in the feature...
The kernel function plays a central role in kernel methods. In this paper, we consider the automated...
International audienceWe study quadrature rules for functions living in an RKHS, using nodes sampled...
International audienceThe design of sparse quadratures for the approximation of integral operators r...
Kernel quadratures and other kernel-based approximation methods typically suffer from prohibitive cu...
© 2018 Society for Industrial and Applied Mathematics. The design of sparse quadratures for the appr...
Regularized kernel discriminant analysis (RKDA) performs linear discriminant analysis in the fea-tur...
We derive new bounds on covering numbers for hypothesis classes generated by convex combinations of ...
This article reviews and studies the properties of Bayesian quadrature weights, which strongly affec...
International audienceWe study a quadrature, proposed by Ermakov and Zolotukhin in the sixties, thro...
In a recent paper we have introduced the class of realised kernel estimators of the increments of qu...
We present an algorithm based on convex optimization for constructing kernels for semi-supervised l...
Abstract. Fowlkes et al. [7] recently introduced an approximation to the Normalized Cut (NCut) group...
International audienceWe investigate evolution strategies with weighted recombi-nation on general co...