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位置参数的稳健置信区间:构形方法

Robust Confidence Intervals for a Location Parameter: The Configural Approach

Journal of the American Statistical Association · 1986
被引 9
ABS 4

中文导读

本文提出两种基于位置-尺度构形的新置信区间估计方法,强置信区间具有稳健的条件覆盖概率,双最优置信区间在保证稳健总体覆盖概率的同时尽可能短,并以高斯和斜线分布为例展示其稳健性。

Abstract

Abstract A conditional approach to robustness is described and applied to interval estimation for a location parameter. Two new types of confidence interval estimators using two-dimensional numerical integrations within location-and-scale configurations emerge. Strong confidence intervals have robust conditional coverage probabilities. Bioptimal confidence intervals are as short as possible and have robust overall coverage probabilities. Robust intervals compromising the Gaussian and the slash distributions serve as examples. A comparison with a variety of other confidence intervals shows the nonrobustness of rank-based interval estimators. For samples of size 10, robust intervals based on M-estimators are clearly superior. Tuning constants must be chosen carefully for interval estimation. An interval based on Tukey's biweight, for example, should be used with tuning constants of about 7, 8, and 11 for samples of size 20, 10, and 5, respectively.

统计学区间估计稳健统计置信区间