基于高维稀疏切片反回归的联邦充分降维

IF 1.1 4区 数学 Q1 MATHEMATICS
Wenquan Cui, Yue Zhao, Jianjun Xu, Haoyang Cheng
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引用次数: 1

摘要

联邦学习已经成为当今大数据时代的一种流行工具。它基于来自不同客户端的数据训练一个集中式模型,同时保持数据的分散。本文首次提出了一种联邦稀疏切片逆回归算法。我们的方法可以同时估计中心降维子空间和在联邦设置中进行变量选择。通过安全无损地构造协方差矩阵,将联邦高维稀疏切片逆回归问题转化为凸优化问题。然后,我们使用乘法器的线性化交替方向方法来估计中心子空间。给出了确定中心子空间维数和算法超参数的贝叶斯信息准则和holdout验证方法。在异构环境下,建立了估计器统计误差率的上界。通过仿真和实际应用验证了该方法的有效性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Federated Sufficient Dimension Reduction Through High-Dimensional Sparse Sliced Inverse Regression

Federated Sufficient Dimension Reduction Through High-Dimensional Sparse Sliced Inverse Regression
Federated learning has become a popular tool in the big data era nowadays. It trains a centralized model based on data from different clients while keeping data decentralized. In this paper, we propose a federated sparse sliced inverse regression algorithm for the first time. Our method can simultaneously estimate the central dimension reduction subspace and perform variable selection in a federated setting. We transform this federated high-dimensional sparse sliced inverse regression problem into a convex optimization problem by constructing the covariance matrix safely and losslessly. We then use a linearized alternating direction method of multipliers algorithm to estimate the central subspace. We also give approaches of Bayesian information criterion and holdout validation to ascertain the dimension of the central subspace and the hyper-parameter of the algorithm. We establish an upper bound of the statistical error rate of our estimator under the heterogeneous setting. We demonstrate the effectiveness of our method through simulations and real world applications.
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来源期刊
Communications in Mathematics and Statistics
Communications in Mathematics and Statistics Mathematics-Statistics and Probability
CiteScore
1.80
自引率
0.00%
发文量
36
期刊介绍: Communications in Mathematics and Statistics is an international journal published by Springer-Verlag in collaboration with the School of Mathematical Sciences, University of Science and Technology of China (USTC). The journal will be committed to publish high level original peer reviewed research papers in various areas of mathematical sciences, including pure mathematics, applied mathematics, computational mathematics, and probability and statistics. Typically one volume is published each year, and each volume consists of four issues.
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