Constructing an efficient parametrization of a large, noisy data set of points lying close to a smooth manifold in high dimension remains a fundamental problem. One approach consists in recovering a local parametrization using the local tangent plane. Principal component analysis (PCA) is often the tool of choice, as it returns an optimal basis in the case of noise-free samples from a linear subspace. To process noisy data, PCA must be applied locally, at a scale small enough such that the manifold is approximately linear, but at a scale large enough such that structure may be discerned from noise. Using eigenspace perturbation theory, we adaptively select the scale that minimizes the angle between the subspace estimated by PCA and the true...
In this paper, we develop methods for outlier removal and noise reduction based on weighted local li...
<p>Subspaces and manifolds are two powerful models for high dimensional signals. Subspaces model lin...
Principal curvatures and principal directions are fundamental local geometric properties. They are w...
Constructing an efficient parametrization of a large, noisy data set of points lying close to a smoo...
Constructing an efficient parameterization of a large, noisy data set of points lying close to a smo...
While typically complex and high-dimensional, modern data sets often have a concise underlying struc...
Figure 1: Laser scan of a concertina wire having the geometry of two oppositely wound helices of equ...
Abstract. Numerous dimensionality reduction problems in data analysis involve the recovery of low-di...
The problem of approximating multidimensional data with objects of lower dimension is a classical pr...
We analyze an algorithm based on principal component analysis (PCA) for detecting the dimension k of...
We study the extraction of nonlinear data models in high-dimensional spaces with modified self-organ...
AbstractIn this article, we propose a new estimation methodology to deal with PCA for high-dimension...
We study the extraction of nonlinear data models in high-dimensional spaces with modified self-organ...
Numerous dimensionality reduction problems in data analysis involve the recovery of low-dimensional ...
An important task in the analysis and reconstruction of curvilinear struc-tures from unorganized 3-D...
In this paper, we develop methods for outlier removal and noise reduction based on weighted local li...
<p>Subspaces and manifolds are two powerful models for high dimensional signals. Subspaces model lin...
Principal curvatures and principal directions are fundamental local geometric properties. They are w...
Constructing an efficient parametrization of a large, noisy data set of points lying close to a smoo...
Constructing an efficient parameterization of a large, noisy data set of points lying close to a smo...
While typically complex and high-dimensional, modern data sets often have a concise underlying struc...
Figure 1: Laser scan of a concertina wire having the geometry of two oppositely wound helices of equ...
Abstract. Numerous dimensionality reduction problems in data analysis involve the recovery of low-di...
The problem of approximating multidimensional data with objects of lower dimension is a classical pr...
We analyze an algorithm based on principal component analysis (PCA) for detecting the dimension k of...
We study the extraction of nonlinear data models in high-dimensional spaces with modified self-organ...
AbstractIn this article, we propose a new estimation methodology to deal with PCA for high-dimension...
We study the extraction of nonlinear data models in high-dimensional spaces with modified self-organ...
Numerous dimensionality reduction problems in data analysis involve the recovery of low-dimensional ...
An important task in the analysis and reconstruction of curvilinear struc-tures from unorganized 3-D...
In this paper, we develop methods for outlier removal and noise reduction based on weighted local li...
<p>Subspaces and manifolds are two powerful models for high dimensional signals. Subspaces model lin...
Principal curvatures and principal directions are fundamental local geometric properties. They are w...