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基于交叉验证法的高斯过程鲁棒预测区间估计

Robust prediction interval estimation for Gaussian processes by cross-validation method

Computational Statistics and Data Analysis · 2022
被引 16 · 同刊同年前 7%
ABS 3

中文导读

提出一种两步法,通过交叉验证或最大似然估计确定协方差超参数,再用留一法覆盖概率调整超参数,使预测区间达到名义覆盖水平且宽度较小。

Abstract

Probabilistic regression models typically use the Maximum Likelihood Estimation or Cross-Validation to fit parameters. These methods can give an advantage to the solutions that fit observations on average, but they do not pay attention to the coverage and the width of Prediction Intervals. A robust two-step approach is used to address the problem of adjusting and calibrating Prediction Intervals for Gaussian Processes Regression. First, the covariance hyperparameters are determined by a standard Cross-Validation or Maximum Likelihood Estimation method. A Leave-One-Out Coverage Probability is introduced as a metric to adjust the covariance hyperparameters and assess the optimal type II Coverage Probability to a nominal level. Then a relaxation method is applied to choose the hyperparameters that minimize the Wasserstein distance between the Gaussian distribution with the initial hyperparameters (obtained by Cross-Validation or Maximum Likelihood Estimation) and the proposed Gaussian distribution with the hyperparameters that achieve the desired Coverage Probability. The method gives Prediction Intervals with appropriate coverage probabilities and small widths.

高斯过程预测区间交叉验证超参数调整覆盖概率