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Hauptverfasser: Wu, Yuhang, Zheng, Zeyu, Wang, Yingfei, Zhang, Guangyu, Zhang, Zuohua, Wang, Chu
Format: Preprint
Veröffentlicht: 2022
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2210.06737
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author Wu, Yuhang
Zheng, Zeyu
Wang, Yingfei
Zhang, Guangyu
Zhang, Zuohua
Wang, Chu
author_facet Wu, Yuhang
Zheng, Zeyu
Wang, Yingfei
Zhang, Guangyu
Zhang, Zuohua
Wang, Chu
contents We consider stochastic optimization problems with the dual tasks of (i) effectively finding the optimizer and (ii) reliably conducting statistical inference for the optimal objective function value. We find that classical simulation optimization and stochastic optimization algorithms, despite of their fast convergence rates to the optimizer under strong convexity assumptions, may not come with a valid central limit theorem (CLT) with a vanishing bias. This non-vanishing bias can harm statistical inference and the construction of asymptotically valid confidence intervals. We fix this issue by providing a new stochastic optimization algorithm that on one hand maintains the same fast convergence rate and on the other hand permits the establishment of a valid CLT with vanishing bias. We discuss practical implementations of the proposed algorithm and conduct numerical experiments to illustrate the theoretical findings.
format Preprint
id arxiv_https___arxiv_org_abs_2210_06737
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle Joint Optimization and Statistical Inference for Zero-th Order Simulation Optimization
Wu, Yuhang
Zheng, Zeyu
Wang, Yingfei
Zhang, Guangyu
Zhang, Zuohua
Wang, Chu
Methodology
We consider stochastic optimization problems with the dual tasks of (i) effectively finding the optimizer and (ii) reliably conducting statistical inference for the optimal objective function value. We find that classical simulation optimization and stochastic optimization algorithms, despite of their fast convergence rates to the optimizer under strong convexity assumptions, may not come with a valid central limit theorem (CLT) with a vanishing bias. This non-vanishing bias can harm statistical inference and the construction of asymptotically valid confidence intervals. We fix this issue by providing a new stochastic optimization algorithm that on one hand maintains the same fast convergence rate and on the other hand permits the establishment of a valid CLT with vanishing bias. We discuss practical implementations of the proposed algorithm and conduct numerical experiments to illustrate the theoretical findings.
title Joint Optimization and Statistical Inference for Zero-th Order Simulation Optimization
topic Methodology
url https://arxiv.org/abs/2210.06737