The main goal of this paper is to prove inequalities on the reconstruction error for kernel principal component analysis. With respect to previous work on this topic, our contribution is twofold: (1) we give bounds that explicitly take into account the empirical centering step in this algorithm, and (2) we show that a "localized" approach allows to obtain more accurate bounds. In particular, we show faster rates of convergence towards the minimum reconstruction error; more precisely, we prove that the convergence rate can typically be faster than n (-1/2). We also obtain a new relative bound on the error. A secondary goal, for which we present similar contributions, is to obtain convergence bounds for the partial sums of the biggest or smal...
We propose randomized techniques for speeding up Kernel Principal Component Analysis on three levels...
We develop gain adaptation methods that improve convergence of the Kernel Hebbian Algorithm (KHA) fo...
We develop gain adaptation methods that improve convergence of the kernel Hebbian algorithm (KHA) f...
We study the properties of the eigenvalues of Gram matrices in a non-asymptotic setting. Using local...
We study the properties of the eigenvalues of Gram matrices in a non-asymptotic setting. Using local...
International audienceWe study the properties of the eigenvalues of Gram matrices in a non-asymptoti...
For Principal Component Analysis in Reproducing Kernel Hilbert Spaces (KPCA), optimization over sets...
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 ...
Suboptimal solutions to kernel principal component analysis are considered. Such solutions take on t...
Suboptimal solutions to kernel principal component analysis are considered. Such solutions take on t...
Principal Component Analysis (PCA) is a popular method for dimension reduction and has attracted an...
The eigenvalues of the kernel matrix play an important role in a number of kernel methods, in partic...
The eigenvalues of the kernel matrix play an important role in a number of kernel methods, in parti...
We propose randomized techniques for speeding up Kernel Principal Component Analysis on three levels...
We develop gain adaptation methods that improve convergence of the Kernel Hebbian Algorithm (KHA) fo...
We develop gain adaptation methods that improve convergence of the kernel Hebbian algorithm (KHA) f...
We study the properties of the eigenvalues of Gram matrices in a non-asymptotic setting. Using local...
We study the properties of the eigenvalues of Gram matrices in a non-asymptotic setting. Using local...
International audienceWe study the properties of the eigenvalues of Gram matrices in a non-asymptoti...
For Principal Component Analysis in Reproducing Kernel Hilbert Spaces (KPCA), optimization over sets...
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 ...
Suboptimal solutions to kernel principal component analysis are considered. Such solutions take on t...
Suboptimal solutions to kernel principal component analysis are considered. Such solutions take on t...
Principal Component Analysis (PCA) is a popular method for dimension reduction and has attracted an...
The eigenvalues of the kernel matrix play an important role in a number of kernel methods, in partic...
The eigenvalues of the kernel matrix play an important role in a number of kernel methods, in parti...
We propose randomized techniques for speeding up Kernel Principal Component Analysis on three levels...
We develop gain adaptation methods that improve convergence of the Kernel Hebbian Algorithm (KHA) fo...
We develop gain adaptation methods that improve convergence of the kernel Hebbian algorithm (KHA) f...