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Main Authors: Chen, Xi, Jing, Wenbo, Liu, Weidong, Zhang, Yichen
Format: Preprint
Published: 2022
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Online Access:https://arxiv.org/abs/2210.08393
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author Chen, Xi
Jing, Wenbo
Liu, Weidong
Zhang, Yichen
author_facet Chen, Xi
Jing, Wenbo
Liu, Weidong
Zhang, Yichen
contents The development of modern technology has enabled data collection of unprecedented size, which poses new challenges to many statistical estimation and inference problems. This paper studies the maximum score estimator of a semi-parametric binary choice model under a distributed computing environment without pre-specifying the noise distribution. An intuitive divide-and-conquer estimator is computationally expensive and restricted by a non-regular constraint on the number of machines, due to the highly non-smooth nature of the objective function. We propose (1) a one-shot divide-and-conquer estimator after smoothing the objective to relax the constraint, and (2) a multi-round estimator to completely remove the constraint via iterative smoothing. We specify an adaptive choice of kernel smoother with a sequentially shrinking bandwidth to achieve the superlinear improvement of the optimization error over the multiple iterations. The improved statistical accuracy per iteration is derived, and a quadratic convergence up to the optimal statistical error rate is established. We further provide two generalizations to handle the heterogeneity of datasets and high-dimensional problems where the parameter of interest is sparse.
format Preprint
id arxiv_https___arxiv_org_abs_2210_08393
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle Distributed Estimation and Inference for Semi-parametric Binary Response Models
Chen, Xi
Jing, Wenbo
Liu, Weidong
Zhang, Yichen
Statistics Theory
Machine Learning
The development of modern technology has enabled data collection of unprecedented size, which poses new challenges to many statistical estimation and inference problems. This paper studies the maximum score estimator of a semi-parametric binary choice model under a distributed computing environment without pre-specifying the noise distribution. An intuitive divide-and-conquer estimator is computationally expensive and restricted by a non-regular constraint on the number of machines, due to the highly non-smooth nature of the objective function. We propose (1) a one-shot divide-and-conquer estimator after smoothing the objective to relax the constraint, and (2) a multi-round estimator to completely remove the constraint via iterative smoothing. We specify an adaptive choice of kernel smoother with a sequentially shrinking bandwidth to achieve the superlinear improvement of the optimization error over the multiple iterations. The improved statistical accuracy per iteration is derived, and a quadratic convergence up to the optimal statistical error rate is established. We further provide two generalizations to handle the heterogeneity of datasets and high-dimensional problems where the parameter of interest is sparse.
title Distributed Estimation and Inference for Semi-parametric Binary Response Models
topic Statistics Theory
Machine Learning
url https://arxiv.org/abs/2210.08393