指数族的 E 值:一般情况

Yunda Hao, Peter Grünwald
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引用次数: 0

摘要

我们分析了复合指数族空值的常见电子变量和电子过程类型:基于反向信息投影(RIPr)的最优电子变量、条件(COND)电子变量、通用推理(UI)和序列化 RIPr 电子过程。我们描述了基于简单和贝叶斯混合物的 RIPr 先验的特征,无论是精确的(高斯空值和替代变量)还是近似意义上的(一般指数族)。我们提供了 RIPre 变量与 COND e 变量(同样是精确与近似)相等的条件。基于我们建立的这些及其他相互关系,我们确定了四个 e 统计量与样本量的函数关系,精确用于高斯,一般可达 $o(1)$。对于 $d$ 维的 null 和 alternative,UI 的 e-power 往往比 COND e-variable 的 e-power 小 $(d/2) \log n + O(1)$,后者是明显的赢家。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
E-Values for Exponential Families: the General Case
We analyze common types of e-variables and e-processes for composite exponential family nulls: the optimal e-variable based on the reverse information projection (RIPr), the conditional (COND) e-variable, and the universal inference (UI) and sequen\-tialized RIPr e-processes. We characterize the RIPr prior for simple and Bayes-mixture based alternatives, either precisely (for Gaussian nulls and alternatives) or in an approximate sense (general exponential families). We provide conditions under which the RIPr e-variable is (again exactly vs. approximately) equal to the COND e-variable. Based on these and other interrelations which we establish, we determine the e-power of the four e-statistics as a function of sample size, exactly for Gaussian and up to $o(1)$ in general. For $d$-dimensional null and alternative, the e-power of UI tends to be smaller by a term of $(d/2) \log n + O(1)$ than that of the COND e-variable, which is the clear winner.
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