NEAR-ISOMETRIC LINEAR EMBEDDINGS OF MANIFOLDS

被引：0

作者：

Hegde, Chinmay ^{[1
]}

Sankaranarayanan, Aswin C. ^{[1
]}

Baraniuk, Richard G. ^{[1
]}

机构：

[1] Rice Univ, ECE Dept, Houston, TX 77005 USA

来源：

2012 IEEE STATISTICAL SIGNAL PROCESSING WORKSHOP (SSP) | 2012年

关键词：

Adaptive sampling; Linear Dimensionality Reduction; Whitney's Theorem; REDUCTION;

D O I：

暂无

中图分类号：

TM [电工技术]; TN [电子技术、通信技术];

学科分类号：

0808 ; 0809 ;

摘要：

We propose a new method for linear dimensionality reduction of manifold-modeled data. Given a training set chi of Q points belonging to a manifold M subset of R-N, we construct a linear operator P : R-N -> R-M that approximately preserves the norms of all ((Q)(2)) pairwise difference vectors (or secants) of chi. We design the matrix P via a trace-norm minimization that can be efficiently solved as a semi-definite program (SDP). When chi 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.

引用

页码：728 / 731

页数：4

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