Principal Component Analysis: A Generalized Gini Approach

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Principal Component Analysis: A Generalized Gini Approach

Author

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Charpentier
Arthur
Mussard
Stephane
Tea Ouraga

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Stephane Mussard

Abstract

A principal component analysis based on the generalized Gini correlation index is proposed (Gini PCA). The Gini PCA generalizes the standard PCA based on the variance. It is shown, in the Gaussian case, that the standard PCA is equivalent to the Gini PCA. It is also proven that the dimensionality reduction based on the generalized Gini correlation matrix, that relies on city-block distances, is robust to outliers. Monte Carlo simulations and an application on cars data (with outliers) show the robustness of the Gini PCA and provide different interpretations of the results compared with the variance PCA.

Suggested Citation

Charpentier & Arthur & Mussard & Stephane & Tea Ouraga, 2019. "Principal Component Analysis: A Generalized Gini Approach," Papers 1910.10133, arXiv.org.

Handle: RePEc:arx:papers:1910.10133

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Other versions of this item:

Charpentier, Arthur & Mussard, Stéphane & Ouraga, Téa, 2021. "Principal component analysis: A generalized Gini approach," European Journal of Operational Research, Elsevier, vol. 294(1), pages 236-249.

Arthur Charpentier & Stéphane Mussard & Tea Ouraga, 2019. "Principal Component Analysis : A Generalized Gini Approach," Working Papers hal-02340386, HAL.
Arthur Charpentier & Stéphane Mussard & Tea Ouraga, 2019. "Principal Component Analysis: A Generalized Gini Approach," Working Papers hal-02327521, HAL.

References listed on IDEAS

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Cited by:

Charles Condevaux & Stéphane Mussard & Téa Ouraga & Guillaume Zambrano, 2020. "Generalized Gini linear and quadratic discriminant analyses," METRON, Springer;Sapienza Università di Roma, vol. 78(2), pages 219-236, August.
Vasile Preda & Luigi-Ionut Catana, 2021. "Tsallis Log-Scale-Location Models. Moments, Gini Index and Some Stochastic Orders," Mathematics, MDPI, vol. 9(11), pages 1-22, May.

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Principal Component Analysis: A Generalized Gini Approach

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