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Main Authors: Liu, Qinshuo, Wang, Zixin, Li, Xi-An, Ji, Xinyao, Zhang, Lei, Liu, Lin, Liu, Zhonghua
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2408.02045
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author Liu, Qinshuo
Wang, Zixin
Li, Xi-An
Ji, Xinyao
Zhang, Lei
Liu, Lin
Liu, Zhonghua
author_facet Liu, Qinshuo
Wang, Zixin
Li, Xi-An
Ji, Xinyao
Zhang, Lei
Liu, Lin
Liu, Zhonghua
contents Semiparametric statistics play a pivotal role in a wide range of domains, including but not limited to missing data, causal inference, and transfer learning, to name a few. In many settings, semiparametric theory leads to (nearly) statistically optimal procedures that yet involve numerically solving Fredholm integral equations of the second kind. Traditional numerical methods, such as polynomial or spline approximations, are difficult to scale to multi-dimensional problems. Alternatively, statisticians may choose to approximate the original integral equations by ones with closed-form solutions, resulting in computationally more efficient, but statistically suboptimal or even incorrect procedures. To bridge this gap, we propose a novel framework by formulating the semiparametric estimation problem as a bi-level optimization problem; and then we develop a scalable algorithm called Deep Neural-Nets Assisted Semiparametric Estimation (DNA-SE) by leveraging the universal approximation property of Deep Neural-Nets (DNN) to streamline semiparametric procedures. Through extensive numerical experiments and a real data analysis, we demonstrate the numerical and statistical advantages of $\dnase$ over traditional methods. To the best of our knowledge, we are the first to bring DNN into semiparametric statistics as a numerical solver of integral equations in our proposed general framework.
format Preprint
id arxiv_https___arxiv_org_abs_2408_02045
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle DNA-SE: Towards Deep Neural-Nets Assisted Semiparametric Estimation
Liu, Qinshuo
Wang, Zixin
Li, Xi-An
Ji, Xinyao
Zhang, Lei
Liu, Lin
Liu, Zhonghua
Machine Learning
Semiparametric statistics play a pivotal role in a wide range of domains, including but not limited to missing data, causal inference, and transfer learning, to name a few. In many settings, semiparametric theory leads to (nearly) statistically optimal procedures that yet involve numerically solving Fredholm integral equations of the second kind. Traditional numerical methods, such as polynomial or spline approximations, are difficult to scale to multi-dimensional problems. Alternatively, statisticians may choose to approximate the original integral equations by ones with closed-form solutions, resulting in computationally more efficient, but statistically suboptimal or even incorrect procedures. To bridge this gap, we propose a novel framework by formulating the semiparametric estimation problem as a bi-level optimization problem; and then we develop a scalable algorithm called Deep Neural-Nets Assisted Semiparametric Estimation (DNA-SE) by leveraging the universal approximation property of Deep Neural-Nets (DNN) to streamline semiparametric procedures. Through extensive numerical experiments and a real data analysis, we demonstrate the numerical and statistical advantages of $\dnase$ over traditional methods. To the best of our knowledge, we are the first to bring DNN into semiparametric statistics as a numerical solver of integral equations in our proposed general framework.
title DNA-SE: Towards Deep Neural-Nets Assisted Semiparametric Estimation
topic Machine Learning
url https://arxiv.org/abs/2408.02045