Optimal Subsampling for Large Sample Logistic Regression

For massive data, the family of subsampling algorithms is popular to downsize the data volume and reduce computational burden. Existing studies focus on approximating the ordinary least-square estimate in linear regression, where statistical leverage scores are often used to define subsampling proba...

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Bibliographic Details
Published in:	Journal of the American Statistical Association Vol. 113; no. 522; pp. 829 - 844
Main Authors:	Wang, HaiYing, Zhu, Rong, Ma, Ping
Format:	Journal Article
Language:	English
Published:	United States Taylor & Francis 03.04.2018 Taylor & Francis Group,LLC Taylor & Francis Ltd
Subjects:	A-optimality Algorithms Asymptotic properties Computational efficiency Computing costs Computing time Consistency Data data collection equations Logistic regression Massive data Maximum likelihood estimates Minimization Normality Optimal subsampling Optimization Probability Rare event Regression Regression analysis Statistical analysis Statistical methods Statistics Theory and Methods Rare Event Logistic Regression Optimal Subsampling A-optimality Massive Data
ISSN:	0162-1459, 1537-274X, 1537-274X
Online Access:	Get full text
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Summary:	For massive data, the family of subsampling algorithms is popular to downsize the data volume and reduce computational burden. Existing studies focus on approximating the ordinary least-square estimate in linear regression, where statistical leverage scores are often used to define subsampling probabilities. In this article, we propose fast subsampling algorithms to efficiently approximate the maximum likelihood estimate in logistic regression. We first establish consistency and asymptotic normality of the estimator from a general subsampling algorithm, and then derive optimal subsampling probabilities that minimize the asymptotic mean squared error of the resultant estimator. An alternative minimization criterion is also proposed to further reduce the computational cost. The optimal subsampling probabilities depend on the full data estimate, so we develop a two-step algorithm to approximate the optimal subsampling procedure. This algorithm is computationally efficient and has a significant reduction in computing time compared to the full data approach. Consistency and asymptotic normality of the estimator from a two-step algorithm are also established. Synthetic and real datasets are used to evaluate the practical performance of the proposed method. Supplementary materials for this article are available online.
Bibliography:	ObjectType-Article-1 SourceType-Scholarly Journals-1 ObjectType-Feature-2 content type line 14 content type line 23 HaiYing Wang and Rong Zhu contribute equally.
ISSN:	0162-1459 1537-274X 1537-274X
DOI:	10.1080/01621459.2017.1292914