k样本多项分布问题中参数函数的改进小样本推断

Improved small‐sample inference for functions of parameters in the k$$ k $$‐sample multinomial problem

Scandinavian Journal of Statistics · 2025
被引 0
ABS 3

中文导读

针对k样本多项分布中参数函数的推断,提出一种精确推断方法,在小样本或函数不可微时优于非参数自助法和delta方法,并通过蒙特卡洛实现近似p值和置信区间。

Abstract

Abstract When the target parameter for inference is a real‐valued, continuous function of probabilities in the ‐sample multinomial problem, variance estimation may be challenging. In small samples or when the function is nondifferentiable at the true parameter, methods like the nonparametric bootstrap or delta method may perform poorly. We develop an exact inference method that applies to this general situation. We prove that our proposed exact p ‐value correctly bounds the type I error rate and the associated confidence intervals provide at least nominal coverage; however, they are generally difficult to implement. Thus, we propose a Monte Carlo implementation to approximate the exact p ‐value and confidence intervals that we show to be consistent in the number of iterations. Our approach is general in that it applies to any real‐valued continuous function of multinomial probabilities from an arbitrary number of samples and with different numbers of categories.

计量经济学统计学应用数学人工智能计算机科学