The eigenvalues of the kernel matrix play an important role in a number of kernel methods, in particular, in kernel principal component analysis. It is well known that the eigenvalues of the kernel matrix converge as the number of samples tends to infinity. We derive probabilistic finite sample size bounds on the approximation error of individual eigenvalues which have the important property that the bounds scale with the eigenvalue under consideration, reflecting the actual behavior of the approximation errors as predicted by asymptotic results and observed in numerical simulations. Such scalin
In this paper we analyze the relationships between the eigenvalues of the m × m Gram matrix K for a ...
This paper presents a non-asymptotic statistical analysis of Kernel-PCA with a focus different from ...
This is the second part of a paper that deals with error estimates for the Rayleigh-Ritz approximati...
The eigenvalues of the kernel matrix play an important role in a number of kernel methods, in partic...
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...
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 ...
Abstract—We develop two approaches for analyzing the ap-proximation error bound for the Nyström met...
AbstractThis is the second part of a paper that deals with error estimates for the Rayleigh–Ritz app...
The selection of kernel function which determines the mapping between the input space and the featur...
The paper considers the problem of analyzing the randomized error in the Lp sense for eigenvalue and...
Principal component analysis is an important pattern recognition and dimensionality reduction tool i...
Abstract. In this paper bounds for clusters of eigenvalues of non-selfadjoint matrices are investiga...
In this paper we analyze the relationships between the eigenvalues of the m × m Gram matrix K for a ...
This paper presents a non-asymptotic statistical analysis of Kernel-PCA with a focus different from ...
This is the second part of a paper that deals with error estimates for the Rayleigh-Ritz approximati...
The eigenvalues of the kernel matrix play an important role in a number of kernel methods, in partic...
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...
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 ...
Abstract—We develop two approaches for analyzing the ap-proximation error bound for the Nyström met...
AbstractThis is the second part of a paper that deals with error estimates for the Rayleigh–Ritz app...
The selection of kernel function which determines the mapping between the input space and the featur...
The paper considers the problem of analyzing the randomized error in the Lp sense for eigenvalue and...
Principal component analysis is an important pattern recognition and dimensionality reduction tool i...
Abstract. In this paper bounds for clusters of eigenvalues of non-selfadjoint matrices are investiga...
In this paper we analyze the relationships between the eigenvalues of the m × m Gram matrix K for a ...
This paper presents a non-asymptotic statistical analysis of Kernel-PCA with a focus different from ...
This is the second part of a paper that deals with error estimates for the Rayleigh-Ritz approximati...