We study the properties of the eigenvalues of Gram matrices in a non-asymptotic setting. Using local Rademacher averages, we provide data-dependent and tight bounds for their convergence towards eigenvalues of the corresponding kernel operator. We perform these computations in a functional analytic framework which allows to deal implicitly with reproducing kernel Hilbert spaces of infinite dimension. This can have applications to various kernel algorithms, such as Support Vector Machines (SVM). We focus on Kernel Principal Component Analysis (KPCA) and, using such techniques, we obtain sharp excess risk bounds for the reconstruction error. In these bounds, the dependence on the decay of the spectrum and on the closeness of successive eigenv...
In this paper we analyze the relationships between the eigenvalues of the m × m Gram matrix K for a ...
Functional data analysis is intrinsically infinite dimensional; functional principal component analy...
In this paper, we propose kernel-based smooth estimates of the functional principal components when ...
We study the properties of the eigenvalues of Gram matrices in a non-asymptotic setting. Using local...
Abstract. We study the properties of the eigenvalues of Gram matrices in a non-asymptotic setting. U...
International audienceWe study the properties of the eigenvalues of Gram matrices in a non-asymptoti...
This paper presents a non-asymptotic statistical analysis of Kernel-PCA with a focus different from ...
International audienceThis paper presents a non-asymptotic statistical analysis of Kernel-PCA with a...
This paper presents a non-asymptotic statistical analysis of Kernel-PCA with a focus different from ...
The eigenvalues of the kernel matrix play an important role in a number of kernel methods, in parti...
The eigenvalues of the kernel matrix play an important role in a number of kernel methods, in partic...
For Principal Component Analysis in Reproducing Kernel Hilbert Spaces (KPCA), optimization over sets...
The Principal Component Analysis (PCA) is a famous technique from multivariate statistics. It is fre...
Principal Component Analysis (PCA) is a popular method for dimension reduction and has attracted an...
In this paper we consider two closely related problems: estimation of eigenvalues and eigen-function...
In this paper we analyze the relationships between the eigenvalues of the m × m Gram matrix K for a ...
Functional data analysis is intrinsically infinite dimensional; functional principal component analy...
In this paper, we propose kernel-based smooth estimates of the functional principal components when ...
We study the properties of the eigenvalues of Gram matrices in a non-asymptotic setting. Using local...
Abstract. We study the properties of the eigenvalues of Gram matrices in a non-asymptotic setting. U...
International audienceWe study the properties of the eigenvalues of Gram matrices in a non-asymptoti...
This paper presents a non-asymptotic statistical analysis of Kernel-PCA with a focus different from ...
International audienceThis paper presents a non-asymptotic statistical analysis of Kernel-PCA with a...
This paper presents a non-asymptotic statistical analysis of Kernel-PCA with a focus different from ...
The eigenvalues of the kernel matrix play an important role in a number of kernel methods, in parti...
The eigenvalues of the kernel matrix play an important role in a number of kernel methods, in partic...
For Principal Component Analysis in Reproducing Kernel Hilbert Spaces (KPCA), optimization over sets...
The Principal Component Analysis (PCA) is a famous technique from multivariate statistics. It is fre...
Principal Component Analysis (PCA) is a popular method for dimension reduction and has attracted an...
In this paper we consider two closely related problems: estimation of eigenvalues and eigen-function...
In this paper we analyze the relationships between the eigenvalues of the m × m Gram matrix K for a ...
Functional data analysis is intrinsically infinite dimensional; functional principal component analy...
In this paper, we propose kernel-based smooth estimates of the functional principal components when ...