Spectral M-estimation with Applications to Hidden Markov Models

Dustin Tran; Minjae Kim; Finale Doshi-Velez

Spectral M-estimation with Applications to Hidden Markov Models

Dustin Tran, Minjae Kim, Finale Doshi-Velez

Proceedings of the 19th International Conference on Artificial Intelligence and Statistics, PMLR 51:1421-1430, 2016.

Abstract

Method of moment estimators exhibit appealing statistical properties, such as asymptotic unbiasedness, for nonconvex problems. However, they typically require a large number of samples and are extremely sensitive to model misspecification. In this paper, we apply the framework of M-estimation to develop both a generalized method of moments procedure and a principled method for regularization. Our proposed M-estimator obtains optimal sample efficiency rates (in the class of moment-based estimators) and the same well-known rates on prediction accuracy as other spectral estimators. It also makes it straightforward to incorporate regularization into the sample moment conditions. We demonstrate empirically the gains in sample efficiency from our approach on hidden Markov models.

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BibTeX


@InProceedings{pmlr-v51-tran16,
  title = 	 {Spectral M-estimation with Applications to Hidden Markov Models},
  author = 	 {Tran, Dustin and Kim, Minjae and Doshi-Velez, Finale},
  booktitle = 	 {Proceedings of the 19th International Conference on Artificial Intelligence and Statistics},
  pages = 	 {1421--1430},
  year = 	 {2016},
  editor = 	 {Gretton, Arthur and Robert, Christian C.},
  volume = 	 {51},
  series = 	 {Proceedings of Machine Learning Research},
  address = 	 {Cadiz, Spain},
  month = 	 {09--11 May},
  publisher =    {PMLR},
  pdf = 	 {http://proceedings.mlr.press/v51/tran16.pdf},
  url = 	 {https://proceedings.mlr.press/v51/tran16.html},
  abstract = 	 {Method of moment estimators exhibit appealing statistical properties, such as asymptotic unbiasedness, for nonconvex problems. However, they typically require a large number of samples and are extremely sensitive to model misspecification. In this paper, we apply the framework of M-estimation to develop both a generalized method of moments procedure and a principled method for regularization. Our proposed M-estimator obtains optimal sample efficiency rates (in the class of moment-based estimators) and the same well-known rates on prediction accuracy as other spectral estimators. It also makes it straightforward to incorporate regularization into the sample moment conditions. We demonstrate empirically the gains in sample efficiency from our approach on hidden Markov models.}
}

Endnote

%0 Conference Paper
%T Spectral M-estimation with Applications to Hidden Markov Models
%A Dustin Tran
%A Minjae Kim
%A Finale Doshi-Velez
%B Proceedings of the 19th International Conference on Artificial Intelligence and Statistics
%C Proceedings of Machine Learning Research
%D 2016
%E Arthur Gretton
%E Christian C. Robert	
%F pmlr-v51-tran16
%I PMLR
%P 1421--1430
%U https://proceedings.mlr.press/v51/tran16.html
%V 51
%X Method of moment estimators exhibit appealing statistical properties, such as asymptotic unbiasedness, for nonconvex problems. However, they typically require a large number of samples and are extremely sensitive to model misspecification. In this paper, we apply the framework of M-estimation to develop both a generalized method of moments procedure and a principled method for regularization. Our proposed M-estimator obtains optimal sample efficiency rates (in the class of moment-based estimators) and the same well-known rates on prediction accuracy as other spectral estimators. It also makes it straightforward to incorporate regularization into the sample moment conditions. We demonstrate empirically the gains in sample efficiency from our approach on hidden Markov models.

RIS


TY  - CPAPER
TI  - Spectral M-estimation with Applications to Hidden Markov Models
AU  - Dustin Tran
AU  - Minjae Kim
AU  - Finale Doshi-Velez
BT  - Proceedings of the 19th International Conference on Artificial Intelligence and Statistics
DA  - 2016/05/02
ED  - Arthur Gretton
ED  - Christian C. Robert	
ID  - pmlr-v51-tran16
PB  - PMLR
DP  - Proceedings of Machine Learning Research
VL  - 51
SP  - 1421
EP  - 1430
L1  - http://proceedings.mlr.press/v51/tran16.pdf
UR  - https://proceedings.mlr.press/v51/tran16.html
AB  - Method of moment estimators exhibit appealing statistical properties, such as asymptotic unbiasedness, for nonconvex problems. However, they typically require a large number of samples and are extremely sensitive to model misspecification. In this paper, we apply the framework of M-estimation to develop both a generalized method of moments procedure and a principled method for regularization. Our proposed M-estimator obtains optimal sample efficiency rates (in the class of moment-based estimators) and the same well-known rates on prediction accuracy as other spectral estimators. It also makes it straightforward to incorporate regularization into the sample moment conditions. We demonstrate empirically the gains in sample efficiency from our approach on hidden Markov models.
ER  -

APA


Tran, D., Kim, M. & Doshi-Velez, F.. (2016). Spectral M-estimation with Applications to Hidden Markov Models. Proceedings of the 19th International Conference on Artificial Intelligence and Statistics, in Proceedings of Machine Learning Research 51:1421-1430 Available from https://proceedings.mlr.press/v51/tran16.html.

Spectral M-estimation with Applications to Hidden Markov Models

Abstract

Cite this Paper

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