We revisit the problem of extending the notion of principal component analysis (PCA) to multivariate datasets that satisfy nonlinear constraints, therefore lying on Riemannian manifolds. Our aim is to determine curves on the manifold that retain their canonical interpretability as principal components, while at the same time being flexible enough to capture nongeodesic forms of variation. We introduce the concept of a principal flow, a curve on the manifold passing through the mean of the data, and with the property that, at any point of the curve, the tangent velocity vector attempts to fit the first eigenvector of a tangent space PCA locally at that same point, subject to a smoothness constraint. That is, a particle flowing along the prin...
We study the extraction of nonlinear data models in high-dimensional spaces with modified self-organ...
Abstract: We investigate a method for extracting nonlinear principal components. These principal com...
Principal components are a well established tool in dimension reduction. The extension to principal ...
This paper presents a new framework for manifold learning based on a sequence of principal polynomia...
AbstractPrincipal curves have been defined as smooth curves passing through the “middle” of a multid...
© . This manuscript version is made available under the CC-BY-NC-ND 4.0 license http://creativecommo...
We consider the classification problem and focus on nonlinear methods for classification on manifold...
Functional data analysis on nonlinear manifolds has drawn recent interest. We propose an intrinsic p...
We propose a new approach to analyze data that naturally lie on manifolds. We focus on a special cla...
Principal Component Analysis (PCA) has been widely used for manifold description and dimensionality ...
International audienceThis paper investigates the generalization of Principal Component Analysis (PC...
We study the extraction of nonlinear data models in high-dimensional spaces with modified self-organ...
Constructing an efficient parametrization of a large, noisy data set of points lying close to a smoo...
Principal components are a well established tool in dimension reduction. The extension to principal ...
Abstract: We investigate a method for extracting nonlinear principal components. These principal com...
We study the extraction of nonlinear data models in high-dimensional spaces with modified self-organ...
Abstract: We investigate a method for extracting nonlinear principal components. These principal com...
Principal components are a well established tool in dimension reduction. The extension to principal ...
This paper presents a new framework for manifold learning based on a sequence of principal polynomia...
AbstractPrincipal curves have been defined as smooth curves passing through the “middle” of a multid...
© . This manuscript version is made available under the CC-BY-NC-ND 4.0 license http://creativecommo...
We consider the classification problem and focus on nonlinear methods for classification on manifold...
Functional data analysis on nonlinear manifolds has drawn recent interest. We propose an intrinsic p...
We propose a new approach to analyze data that naturally lie on manifolds. We focus on a special cla...
Principal Component Analysis (PCA) has been widely used for manifold description and dimensionality ...
International audienceThis paper investigates the generalization of Principal Component Analysis (PC...
We study the extraction of nonlinear data models in high-dimensional spaces with modified self-organ...
Constructing an efficient parametrization of a large, noisy data set of points lying close to a smoo...
Principal components are a well established tool in dimension reduction. The extension to principal ...
Abstract: We investigate a method for extracting nonlinear principal components. These principal com...
We study the extraction of nonlinear data models in high-dimensional spaces with modified self-organ...
Abstract: We investigate a method for extracting nonlinear principal components. These principal com...
Principal components are a well established tool in dimension reduction. The extension to principal ...