Single index Fréchet regression

IF 3.2 1区 数学 Q1 STATISTICS & PROBABILITY Annals of Statistics Pub Date : 2023-08-01 DOI:10.1214/23-aos2307
Satarupa Bhattacharjee, Hans-Georg Müller
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引用次数: 6

Abstract

Single index models provide an effective dimension reduction tool in regression, especially for high-dimensional data, by projecting a general multivariate predictor onto a direction vector. We propose a novel single-index model for regression models where metric space-valued random object responses are coupled with multivariate Euclidean predictors. The responses in this regression model include complex, non-Euclidean data, including covariance matrices, graph Laplacians of networks and univariate probability distribution functions, among other complex objects that lie in abstract metric spaces. While Fréchet regression has proved useful for modeling the conditional mean of such random objects given multivariate Euclidean vectors, it does not provide for regression parameters such as slopes or intercepts, since the metric space-valued responses are not amenable to linear operations. As a consequence, distributional results for Fréchet regression have been elusive. We show here that for the case of multivariate Euclidean predictors, the parameters that define a single index and projection vector can be used to substitute for the inherent absence of parameters in Fréchet regression. Specifically, we derive the asymptotic distribution of suitable estimates of these parameters, which then can be utilized to test linear hypotheses for the parameters, subject to an identifiability condition. Consistent estimation of the link function of the single index Fréchet regression model is obtained through local linear Fréchet regression. We demonstrate the finite sample performance of estimation and inference for the proposed single index Fréchet regression model through simulation studies, including the special cases where responses are probability distributions and graph adjacency matrices. The method is illustrated for resting-state functional Magnetic Resonance Imaging (fMRI) data from the ADNI study.
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单指数回归法
单指标模型通过将一般的多变量预测器投影到方向向量上,为回归提供了有效的降维工具,特别是对于高维数据。我们提出了一种新的单指标模型的回归模型,其中度量空间值随机对象响应与多元欧几里得预测相耦合。该回归模型中的响应包括复杂的非欧几里得数据,包括协方差矩阵、网络的图拉普拉斯函数和单变量概率分布函数,以及抽象度量空间中的其他复杂对象。虽然fracimet回归已被证明对给定多变量欧几里得向量的随机对象的条件均值建模是有用的,但它不提供回归参数,如斜率或截距,因为度量空间值响应不适合线性操作。因此,fracimet回归的分布结果是难以捉摸的。我们在这里表明,对于多元欧几里得预测器的情况下,定义单个指标和投影向量的参数可以用来代替在fr切特回归中固有的参数缺失。具体地说,我们推导了这些参数的适当估计的渐近分布,然后可以利用它来检验参数的线性假设,但要符合可辨识条件。通过局部线性fr切特回归,得到单指标fr切特回归模型的链接函数的一致性估计。我们通过仿真研究证明了所提出的单指数frachimet回归模型的有限样本估计和推理性能,包括响应为概率分布和图邻接矩阵的特殊情况。ADNI研究的静息状态功能磁共振成像(fMRI)数据说明了该方法。
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来源期刊
Annals of Statistics
Annals of Statistics 数学-统计学与概率论
CiteScore
9.30
自引率
8.90%
发文量
119
审稿时长
6-12 weeks
期刊介绍: The Annals of Statistics aim to publish research papers of highest quality reflecting the many facets of contemporary statistics. Primary emphasis is placed on importance and originality, not on formalism. The journal aims to cover all areas of statistics, especially mathematical statistics and applied & interdisciplinary statistics. Of course many of the best papers will touch on more than one of these general areas, because the discipline of statistics has deep roots in mathematics, and in substantive scientific fields.
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ON BLOCKWISE AND REFERENCE PANEL-BASED ESTIMATORS FOR GENETIC DATA PREDICTION IN HIGH DIMENSIONS. RANK-BASED INDICES FOR TESTING INDEPENDENCE BETWEEN TWO HIGH-DIMENSIONAL VECTORS. Single index Fréchet regression Graphical models for nonstationary time series On lower bounds for the bias-variance trade-off
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