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S形函数的非参数、无调参估计

Nonparametric, Tuning-Free Estimation of S-Shaped Functions

Journal of the Royal Statistical Society. Series B: Statistical Methodology · 2022
被引 3
ABS 4

中文导读

研究了S形回归函数的非参数估计,提出一种无需调参的最小二乘估计方法,通过混合原始对偶基算法高效计算,并证明了估计量的最优收敛速度,适用于空气污染建模等场景。

Abstract

Abstract We consider the nonparametric estimation of an S-shaped regression function. The least squares estimator provides a very natural, tuning-free approach, but results in a non-convex optimization problem, since the inflection point is unknown. We show that the estimator may nevertheless be regarded as a projection onto a finite union of convex cones, which allows us to propose a mixed primal-dual bases algorithm for its efficient, sequential computation. After developing a projection framework that demonstrates the consistency and robustness to misspecification of the estimator, our main theoretical results provide sharp oracle inequalities that yield worst-case and adaptive risk bounds for the estimation of the regression function, as well as a rate of convergence for the estimation of the inflection point. These results reveal not only that the estimator achieves the minimax optimal rate of convergence for both the estimation of the regression function and its inflection point (up to a logarithmic factor in the latter case), but also that it is able to achieve an almost-parametric rate when the true regression function is piecewise affine with not too many affine pieces. Simulations and a real data application to air pollution modelling also confirm the desirable finite-sample properties of the estimator, and our algorithm is implemented in the R package Sshaped.

非参数估计回归分析优化算法统计学习