Near-isometric linear embeddings of manifolds

Author

Hegde, Chinmay ; Sankaranarayanan, Aswin C. ; Baraniuk, Richard G.

Author_Institution

ECE Dept., Rice Univ., Houston, TX, USA

fYear

2012

fDate

5-8 Aug. 2012

Firstpage

728

Lastpage

731

Abstract

We propose a new method for linear dimensionality reduction of manifold-modeled data. Given a training set X of Q points belonging to a manifold M ⊂ ℝ^N, we construct a linear operator P : ℝ^N → ℝ^M that approximately preserves the norms of all (₂^Q) pairwise difference vectors (or secants) of X. We design the matrix P via a trace-norm minimization that can be efficiently solved as a semi-definite program (SDP). When X comprises a sufficiently dense sampling of M, we prove that the optimal matrix P preserves all pairs of secants over M. We numerically demonstrate the considerable gains using our SDP-based approach over existing linear dimensionality reduction methods, such as principal components analysis (PCA) and random projections.

Keywords

minimisation; principal component analysis; signal processing; vectors; Q points; SDP-based approach; dense sampling; linear dimensionality reduction; manifold-modeled data; near-isometric linear embeddings; pairwise difference vectors; principal components analysis; random projections; semi-definite program; trace-norm minimization; training set X; Linear matrix inequalities; Manifolds; Measurement uncertainty; Principal component analysis; Programming; Training; Vectors; Adaptive sampling; Linear Dimensionality Reduction; Whitney´s Theorem;

fLanguage

English

Publisher

ieee

Conference_Titel

Statistical Signal Processing Workshop (SSP), 2012 IEEE

Conference_Location

Ann Arbor, MI

ISSN

pending

Print_ISBN

978-1-4673-0182-4

Electronic_ISBN

pending

Type

conf

DOI

10.1109/SSP.2012.6319806

Filename

6319806