Angle 2DPCA: A New Formulation for 2DPCA

Quanxue Gao; Lan Ma; Yang Liu; Xinbo Gao; Feiping Nie

doi:10.1109/TCYB.2017.2712740

Angle 2DPCA: A New Formulation for 2DPCA

Quanxue Gao, Lan Ma, Yang Liu, Xinbo Gao, Feiping Nie

Research output: Contribution to journal › Article › peer-review

83 Scopus citations

Abstract

2-D principal component analysis (2DPCA), which employs squared F-norm as the distance metric, has been widely used in dimensionality reduction for data representation and classification. It, however, is commonly known that squared F -norm is very sensitivity to outliers. To handle this problem, we present a novel formulation for 2DPCA, namely Angle-2DPCA. It employs F -norm as the distance metric and takes into consideration the relationship between reconstruction error and variance in the objective function. We present a fast iterative algorithm to solve the solution of Angle-2DPCA. Experimental results on the Extended Yale B, AR, and PIE face image databases illustrate the effectiveness of our proposed approach.

Original language	English
Pages (from-to)	1672-1678
Number of pages	7
Journal	IEEE Transactions on Cybernetics
Volume	48
Issue number	5
DOIs	https://doi.org/10.1109/TCYB.2017.2712740
State	Published - May 2018
Externally published	Yes

Keywords

2-D principal component analysis (2DPCA)
angle
dimensionality reduction

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10.1109/TCYB.2017.2712740

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title = "Angle 2DPCA: A New Formulation for 2DPCA",

abstract = "2-D principal component analysis (2DPCA), which employs squared F-norm as the distance metric, has been widely used in dimensionality reduction for data representation and classification. It, however, is commonly known that squared F -norm is very sensitivity to outliers. To handle this problem, we present a novel formulation for 2DPCA, namely Angle-2DPCA. It employs F -norm as the distance metric and takes into consideration the relationship between reconstruction error and variance in the objective function. We present a fast iterative algorithm to solve the solution of Angle-2DPCA. Experimental results on the Extended Yale B, AR, and PIE face image databases illustrate the effectiveness of our proposed approach.",

keywords = "2-D principal component analysis (2DPCA), angle, dimensionality reduction",

author = "Quanxue Gao and Lan Ma and Yang Liu and Xinbo Gao and Feiping Nie",

note = "Publisher Copyright: {\textcopyright} 2013 IEEE.",

year = "2018",

month = may,

doi = "10.1109/TCYB.2017.2712740",

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T1 - Angle 2DPCA

T2 - A New Formulation for 2DPCA

AU - Gao, Quanxue

AU - Ma, Lan

AU - Liu, Yang

AU - Gao, Xinbo

AU - Nie, Feiping

PY - 2018/5

Y1 - 2018/5

N2 - 2-D principal component analysis (2DPCA), which employs squared F-norm as the distance metric, has been widely used in dimensionality reduction for data representation and classification. It, however, is commonly known that squared F -norm is very sensitivity to outliers. To handle this problem, we present a novel formulation for 2DPCA, namely Angle-2DPCA. It employs F -norm as the distance metric and takes into consideration the relationship between reconstruction error and variance in the objective function. We present a fast iterative algorithm to solve the solution of Angle-2DPCA. Experimental results on the Extended Yale B, AR, and PIE face image databases illustrate the effectiveness of our proposed approach.

AB - 2-D principal component analysis (2DPCA), which employs squared F-norm as the distance metric, has been widely used in dimensionality reduction for data representation and classification. It, however, is commonly known that squared F -norm is very sensitivity to outliers. To handle this problem, we present a novel formulation for 2DPCA, namely Angle-2DPCA. It employs F -norm as the distance metric and takes into consideration the relationship between reconstruction error and variance in the objective function. We present a fast iterative algorithm to solve the solution of Angle-2DPCA. Experimental results on the Extended Yale B, AR, and PIE face image databases illustrate the effectiveness of our proposed approach.

KW - 2-D principal component analysis (2DPCA)

KW - angle

KW - dimensionality reduction

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DO - 10.1109/TCYB.2017.2712740

M3 - 文章

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AN - SCOPUS:85023762470

SN - 2168-2267

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SP - 1672

EP - 1678

JO - IEEE Transactions on Cybernetics

JF - IEEE Transactions on Cybernetics

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ER -

Angle 2DPCA: A New Formulation for 2DPCA

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Keywords

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