Automatic motion capture data denoising via filtered subspace clustering and low rank matrix approximation

In this paper, we present an automatic Motion Capture (MoCap) data denoising approach via filtered subspace clustering and low rank matrix approximation. Within the proposed approach, we formulate the MoCap data denoising problem as a concatenation of piecewise motion matrix recovery problem. To thi...

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Vydáno v:Signal processing Ročník 105; s. 350 - 362
Hlavní autoři: Liu, Xin, Cheung, Yiu-ming, Peng, Shu-Juan, Cui, Zhen, Zhong, Bineng, Du, Ji-Xiang
Médium: Journal Article
Jazyk:angličtina
Vydáno: Amsterdam Elsevier B.V 01.12.2014
Elsevier
Témata:
Accelerated proximal gradient
Applied sciences
Detection, estimation, filtering, equalization, prediction
Exact sciences and technology
Filtered subspace clustering
Image processing
Information, signal and communications theory
Low-rank matrix approximation
MoCap data denoising
Moving average filter
Signal and communications theory
Signal processing
Signal representation. Spectral analysis
Signal, noise
Telecommunications and information theory
Filtered subspace clustering
Moving average filter
MoCap data denoising
Accelerated proximal gradient
Low-rank matrix approximation
Performance evaluation
Automatic classification
State of the art
Moving average
Noise reduction
Subspace method
Signal classification
Learning
Concatenation
Signal processing
Motion detection
Gradient method
ISSN:0165-1684, 1872-7557
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Popis
Shrnutí:In this paper, we present an automatic Motion Capture (MoCap) data denoising approach via filtered subspace clustering and low rank matrix approximation. Within the proposed approach, we formulate the MoCap data denoising problem as a concatenation of piecewise motion matrix recovery problem. To this end, we first present a filtered subspace clustering approach to separate the noisy MoCap sequence into a group of disjoint piecewise motions, in which the moving trajectories of each piecewise motion always share the similar low dimensional subspace representation. Then, we employ the accelerated proximal gradient (APG) algorithm to find a complete low-rank matrix approximation to each noisy piecewise motion and further apply a moving average filter to smooth the moving trajectories between the connected motions. Finally, the whole noisy MoCap data can be automatically restored by a concatenation of all the recovered piecewise motions sequentially. The proposed approach does not need any physical information about the underling structure of MoCap data or require auxiliary data sets for training priors. The experimental results have shown an improved performance in comparison with the state-of-the-art competing approaches. • We represent MoCap matrix by a mixture of multiple low-dimensional sub-matrices. • We formulate the MoCap denoising as a concatenation of piecewise motion matrix recovery problem. • We present a filtered subspace clustering to separate the noisy MoCap sequence. • We introduce a label filtering scheme to regularize the subspace length. • We find a complete low-rank matrix approximation to each noisy piecewise motion.
ISSN:0165-1684
1872-7557
DOI:10.1016/j.sigpro.2014.06.009