Article

Metric learning by collapsing classes

Authors:

Amir Globerson,

Sam RoweisAuthors Info & Claims

NIPS'05: Proceedings of the 18th International Conference on Neural Information Processing Systems

Pages 451 - 458

Published: 05 December 2005 Publication History

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Abstract

We present an algorithm for learning a quadratic Gaussian metric (Mahalanobis distance) for use in classification tasks. Our method relies on the simple geometric intuition that a good metric is one under which points in the same class are simultaneously near each other and far from points in the other classes. We construct a convex optimization problem whose solution generates such a metric by trying to collapse all examples in the same class to a single point and push examples in other classes infinitely far away. We show that when the metric we learn is used in simple classifiers, it yields substantial improvements over standard alternatives on a variety of problems. We also discuss how the learned metric may be used to obtain a compact low dimensional feature representation of the original input space, allowing more efficient classification with very little reduction in performance.

References

[1]

N. Alon and P. Pudlak. Equilateral sets in lⁿ_p. Geom. Funct. Anal, 13(3), 2003.

Google Scholar

[2]

P. N. Belhumeur, J. Hespanha, and D. J. Kriegman. Eigenfaces vs. Fisherfaces: Recognition using class specific linear projection. In ECCV (1), 1996.

Crossref

Google Scholar

[3]

D.P. Bertsekas. On the Goldstein-Levitin-Polyak gradient projection method. IEEE Transaction on Automatic Control, 21 (2):174-184, 1976.

Google Scholar

[4]

S. Boyd and L. Vandenberghe. Convex Optimization. Cambridge Univ. Press, 2004.

Crossref

Google Scholar

[5]

J. Goldberger, S. Roweis, G. Hinton, and R. Salakhutdinov. Neighbourhood components analysis. In Advances in Neural Information Processing Systems (NIPS), 2004.

Google Scholar

[6]

T. Hastie, R. Tibshirani, and J.H. Friedman. The elements of statistical learning: data mining, inference, and prediction. New York: Springer-Verlag, 2001.

Google Scholar

[7]

G. Hinton and S. Roweis. Stochastic neighbor embedding. In Advances in Neural Information Processing Systems (NIPS), 2002.

Google Scholar

[8]

A. Ng, M. Jordan, and Y. Weiss. On spectral clustering: Analysis and an algorithm. In Advances in Neural Information Processing Systems (NIPS), 2001.

Google Scholar

[9]

N. Shental, T. Hertz, D. Weinshall, and M. Pavel. Adjustment learning and relevant component analysis. In Proc. of ECCV, 2002.

Crossref

Google Scholar

[10]

E. Xing, A. Ng, M. Jordan, and S. Russell. Distance metric learning, with application to clustering with side-information. In Advances in Neural Information Processing Systems (NIPS), 2004.

Google Scholar

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https://dl.acm.org/doi/10.1007/s11063-018-9920-7
Li WShi YYang WWang HGao Y(2021)Interactive image segmentation via cascaded metric learning2015 IEEE International Conference on Image Processing (ICIP)10.1109/ICIP.2015.7351333(2900-2904)Online publication date: 9-Mar-2021
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Laidler GMorgan LNelson BPavlidis N(2020)Metric learning for simulation analyticsProceedings of the Winter Simulation Conference10.5555/3466184.3466222(349-360)Online publication date: 14-Dec-2020
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Metric learning by collapsing classes
1. Computing methodologies
  1. Machine learning
    1. Learning paradigms
      1. Supervised learning

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NIPS'05: Proceedings of the 18th International Conference on Neural Information Processing Systems

December 2005

1656 pages

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MIT Press

Cambridge, MA, United States

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Published: 05 December 2005

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Zhao GWu Y(2022)Efficient Large Margin-Based Feature ExtractionNeural Processing Letters10.1007/s11063-018-9920-750:2(1257-1279)Online publication date: 11-Mar-2022
https://dl.acm.org/doi/10.1007/s11063-018-9920-7
Li WShi YYang WWang HGao Y(2021)Interactive image segmentation via cascaded metric learning2015 IEEE International Conference on Image Processing (ICIP)10.1109/ICIP.2015.7351333(2900-2904)Online publication date: 9-Mar-2021
https://dl.acm.org/doi/10.1109/ICIP.2015.7351333
Laidler GMorgan LNelson BPavlidis N(2020)Metric learning for simulation analyticsProceedings of the Winter Simulation Conference10.5555/3466184.3466222(349-360)Online publication date: 14-Dec-2020
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Cheng DGong YShi WZhang S(2018)Person re-identification by the asymmetric triplet and identification loss functionMultimedia Tools and Applications10.1007/s11042-017-5182-z77:3(3533-3550)Online publication date: 1-Feb-2018
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Yuan CXu CWang TLiu FZhao ZFeng PGuo J(2018)Deep multi-instance learning for end-to-end person re-identificationMultimedia Tools and Applications10.1007/s11042-017-4896-277:10(12437-12467)Online publication date: 1-May-2018
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Saxena SPandey SKhanna P(2018)A semi-supervised domain adaptation assembling approach for image classificationPattern Analysis & Applications10.1007/s10044-017-0664-121:3(813-827)Online publication date: 1-Aug-2018
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Li LSun CLin LLi JJiang S(2018)A Mahalanobis metric learning-based polynomial kernel for classification of hyperspectral imagesNeural Computing and Applications10.1007/s00521-016-2499-x29:4(1103-1113)Online publication date: 1-Feb-2018
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Harandi MSalzmann MHartley R(2017)Joint dimensionality reduction and metric learningProceedings of the 34th International Conference on Machine Learning - Volume 7010.5555/3305381.3305526(1404-1413)Online publication date: 6-Aug-2017
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Shi YLi WGao YCao LShen DSingh SMarkovitch S(2017)Beyond IIDProceedings of the Thirty-First AAAI Conference on Artificial Intelligence10.5555/3298239.3298461(1524-1531)Online publication date: 4-Feb-2017
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