具有最佳准确性的序数预测模型中的假设检验。

IF 1.4 4区 数学 Q3 BIOLOGY
Biometrics Pub Date : 2024-07-01 DOI:10.1093/biomtc/ujae079
Yuyang Liu, Shan Luo, Jialiang Li
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引用次数: 0

摘要

在涉及多类序数判别的实际应用中,一种常见的方法是将多个预测变量聚合成一个线性组合,从而开发出一种预测精度高的分类器。对这种多类分类器的评估通常使用 ROC 流形下的超体积(HUM)。在处理大量潜在预测因子并实现最佳 HUM 时,必须进行适当的统计推断。然而,现有文献中普遍采用的方法计算成本高昂。我们建议使用杰克刀经验似然法(jackknife empirical likelihood method)来解决这一问题。我们建立了温和条件下的 Wilks' 定理,并提供了 Pitman 备选方案下的幂次分析。我们还引入了一种基于网络的新型快速计算算法,专门用于计算测试程序中的一般多样本 U$ 统计量。为了将我们的方法与现有方法进行比较,我们进行了大量模拟。结果表明,我们的方法在测试规模、功率和实施时间方面都具有卓越的性能。此外,我们还应用我们的方法分析了一个真实的医疗数据集,并获得了一些新的发现。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Hypothesis tests in ordinal predictive models with optimal accuracy.

In real-world applications involving multi-class ordinal discrimination, a common approach is to aggregate multiple predictive variables into a linear combination, aiming to develop a classifier with high prediction accuracy. Assessment of such multi-class classifiers often utilizes the hypervolume under ROC manifolds (HUM). When dealing with a substantial pool of potential predictors and achieving optimal HUM, it becomes imperative to conduct appropriate statistical inference. However, prevalent methodologies in existing literature are computationally expensive. We propose to use the jackknife empirical likelihood method to address this issue. The Wilks' theorem under moderate conditions is established and the power analysis under the Pitman alternative is provided. We also introduce a novel network-based rapid computation algorithm specifically designed for computing a general multi-sample $U$-statistic in our test procedure. To compare our approach against existing approaches, we conduct extensive simulations. Results demonstrate the superior performance of our method in terms of test size, power, and implementation time. Furthermore, we apply our method to analyze a real medical dataset and obtain some new findings.

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来源期刊
Biometrics
Biometrics 生物-生物学
CiteScore
2.70
自引率
5.30%
发文量
178
审稿时长
4-8 weeks
期刊介绍: The International Biometric Society is an international society promoting the development and application of statistical and mathematical theory and methods in the biosciences, including agriculture, biomedical science and public health, ecology, environmental sciences, forestry, and allied disciplines. The Society welcomes as members statisticians, mathematicians, biological scientists, and others devoted to interdisciplinary efforts in advancing the collection and interpretation of information in the biosciences. The Society sponsors the biennial International Biometric Conference, held in sites throughout the world; through its National Groups and Regions, it also Society sponsors regional and local meetings.
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