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关于观察到误导性统计证据的概率

On the Probability of Observing Misleading Statistical Evidence

Journal of the American Statistical Association · 2000
被引 61
ABS 4

中文导读

研究了似然比作为统计证据强度度量时,观察到强误导证据的概率上限,包括适用于所有分布对的通用界和固定维参数模型大样本下的更紧界。

Abstract

Abstract The law of likelihood explains how to interpret statistical data as evidence. Specifically, it gives to the discipline of statistics a precise and objective measure of the strength of statistical evidence supporting one probability distribution vis-à-vis another. That measure is the likelihood ratio. But evidence, even when properly interpreted, can be misleading—observations can truly constitute strong evidence supporting one distribution when the other is true. What makes statistical evidence valuable to science is that this cannot occur very often. Here we examine two bounds on the probability of observing strong misleading evidence. One is a universal bound, applicable to every pair of probability distributions. The other bound, much smaller, applies to all pairs of distributions within fixed-dimensional parametric models in large samples. The second bound comes from examining how the probability of strong misleading evidence varies as a function of the alternative value of the parameter. We show that in large samples one curve describes how this probability first rises and then falls as the alternative moves away from the true parameter value for a very wide class of models. We also show that this large-sample curve, and the bound that its maximum value represents, applies to profile likelihood ratios for one-dimensional parameters in fixed-dimensional parametric models, but does not apply to the estimated likelihood ratios that result from replacing the nuisance parameters by their global maximum likelihood estimates.

统计学计量经济学参数模型似然函数概率分布