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High-Dimensional Spatial Quantile Function-on-Scalar Regression

Zhengwu Zhang, Xiao Wang, Linglong Kong, Hongtu Zhu

2021Journal of the American Statistical Association22 citationsDOIOpen Access PDF

Abstract

This article develops a novel spatial quantile function-on-scalar regression model, which studies the conditional spatial distribution of a high-dimensional functional response given scalar predictors. With the strength of both quantile regression and copula modeling, we are able to explicitly characterize the conditional distribution of the functional or image response on the whole spatial domain. Our method provides a comprehensive understanding of the effect of scalar covariates on functional responses across different quantile levels and also gives a practical way to generate new images for given covariate values. Theoretically, we establish the minimax rates of convergence for estimating coefficient functions under both fixed and random designs. We further develop an efficient primal-dual algorithm to handle high-dimensional image data. Simulations and real data analysis are conducted to examine the finite-sample performance.

Topics & Concepts

QuantileQuantile regressionCovariateQuantile functionMathematicsConditional probability distributionMinimaxScalar (mathematics)Copula (linguistics)Spatial analysisStatisticsConditional expectationApplied mathematicsEconometricsMathematical optimizationProbability density functionCumulative distribution functionGeometryStatistical Methods and InferenceSpatial and Panel Data AnalysisStatistical Methods and Bayesian Inference
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