On the Existence of Uniformly Most Powerful Bayesian Tests With Application to Non-Central Chi-Squared Tests.

IF 4.9 2区 数学 Q1 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS
Bayesian Analysis Pub Date : 2021-03-01 Epub Date: 2020-01-07 DOI:10.1214/19-ba1194
Amir Nikooienejad, Valen E Johnson
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引用次数: 2

Abstract

Uniformly most powerful Bayesian tests (UMPBT's) are an objective class of Bayesian hypothesis tests that can be considered the Bayesian counterpart of classical uniformly most powerful tests. Because the rejection regions of UMPBT's can be matched to the rejection regions of classical uniformly most powerful tests (UMPTs), UMPBT's provide a mechanism for calibrating Bayesian evidence thresholds, Bayes factors, classical significance levels and p-values. The purpose of this article is to expand the application of UMPBT's outside the class of exponential family models. Specifically, we introduce sufficient conditions for the existence of UMPBT's and propose a unified approach for their derivation. An important application of our methodology is the extension of UMPBT's to testing whether the non-centrality parameter of a chi-squared distribution is zero. The resulting tests have broad applicability, providing default alternative hypotheses to compute Bayes factors in, for example, Pearson's chi-squared test for goodness-of-fit, tests of independence in contingency tables, and likelihood ratio, score and Wald tests.

一致最强贝叶斯检验的存在性及其在非中心卡方检验中的应用
均匀最强贝叶斯检验(UMPBT)是一类客观的贝叶斯假设检验,可以被认为是经典均匀最强贝叶斯检验的贝叶斯对应物。由于UMPBT的拒绝区域可以与经典统一最强大检验(UMPTs)的拒绝区域相匹配,因此UMPBT提供了一种校准贝叶斯证据阈值、贝叶斯因子、经典显著性水平和p值的机制。本文的目的是扩展UMPBT在指数族模型之外的应用。具体来说,我们引入了UMPBT存在的充分条件,并提出了统一的推导方法。我们的方法的一个重要应用是扩展了UMPBT来检验卡方分布的非中心性参数是否为零。由此产生的检验具有广泛的适用性,为计算贝叶斯因子提供了默认的替代假设,例如,用于拟合优度的皮尔逊卡方检验、列联表中的独立性检验以及似然比、分数和沃尔德检验。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Bayesian Analysis
Bayesian Analysis 数学-数学跨学科应用
CiteScore
6.50
自引率
13.60%
发文量
59
审稿时长
>12 weeks
期刊介绍: Bayesian Analysis is an electronic journal of the International Society for Bayesian Analysis. It seeks to publish a wide range of articles that demonstrate or discuss Bayesian methods in some theoretical or applied context. The journal welcomes submissions involving presentation of new computational and statistical methods; critical reviews and discussions of existing approaches; historical perspectives; description of important scientific or policy application areas; case studies; and methods for experimental design, data collection, data sharing, or data mining. Evaluation of submissions is based on importance of content and effectiveness of communication. Discussion papers are typically chosen by the Editor in Chief, or suggested by an Editor, among the regular submissions. In addition, the Journal encourages individual authors to submit manuscripts for consideration as discussion papers.
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