Title :
Estimation of intrinsic dimensionality of samples from noisy low-dimensional manifolds in high dimensions with multiscale SVD
Author :
Little, Anna V. ; Lee, Jason ; Jung, Yoon-Mo ; Maggioni, Mauro
Author_Institution :
Dept. of Math., Duke Univ., Durham, NC, USA
Abstract :
The problem of estimating the intrinsic dimensionality of certain point clouds is of interest in many applications in statistics and analysis of high-dimensional data sets. Our setting is the following: the points are sampled from a manifold M of dimension k, embedded in RopfD, with k Lt D, and corrupted by D-dimensional noise. When M is a linear manifold (hyperplane), one may analyse this situation by SVD, hoping the noise would perturb the rank k covariance matrix. When M is a nonlinear manifold, SVD performed globally may dramatically overestimate the intrinsic dimensionality. We discuss a multiscale version SVD that is useful in estimating the intrinsic dimensionality of nonlinear manifolds.
Keywords :
covariance matrices; singular value decomposition; intrinsic dimensionality estimation; multiscale SVD; noisy low-dimensional manifold; nonlinear manifold; point cloud; rank k covariance matrix; singular value decomposition; Clouds; Covariance matrix; Data analysis; Density measurement; Machine learning; Machine learning algorithms; Manifolds; Principal component analysis; Singular value decomposition; Volume measurement; Multiscale analysis; PCA; SVD; high dimensional data; intrinsic dimensionality; manifolds; point clouds; sample covariance;
Conference_Titel :
Statistical Signal Processing, 2009. SSP '09. IEEE/SP 15th Workshop on
Conference_Location :
Cardiff
Print_ISBN :
978-1-4244-2709-3
Electronic_ISBN :
978-1-4244-2711-6
DOI :
10.1109/SSP.2009.5278634
