一个三参数逻辑回归模型

IF 0.7 Q3 STATISTICS & PROBABILITY
Xiaoli Yu, Shaoting Li, Jiahua Chen
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引用次数: 0

摘要

剂量反应实验和数据分析通常根据模型假设下的最佳设计进行。双参数逻辑模型由于其良好的数学性质和合理的随机响应机制而经常被使用。关于它的优化设计和数据分析策略,有大量的文献。然而,在现实世界的应用中,模型充其量是一个很好的近似值,研究人员必须意识到模型错误规范的风险。在本文中,我们在三参数逻辑回归模型下研究了顺序ED设计、D最优设计和上下设计的有效性,并开发了一种参数估计的数值方法。仿真结果表明,该模型与数据分析策略的结合效果良好。当逻辑模型正确时,这种更复杂的模型几乎没有任何效率损失。在存在模型错误规范的情况下,三参数逻辑模型比两参数逻辑模型工作得更好。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
A three-parameter logistic regression model
Dose–response experiments and data analyses are often carried out according to an optimal design under a model assumption. A two-parameter logistic model is often used because of its nice mathematical properties and plausible stochastic response mechanisms. There is an extensive literature on its optimal designs and data analysis strategies. However, a model is at best a good approximation in a real-world application, and researchers must be aware of the risk of model mis-specification. In this paper, we investigate the effectiveness of the sequential ED-design, the D-optimal design, and the up-and-down design under the three-parameter logistic regression model, and we develop a numerical method for the parameter estimation. Simulations show that the combination of the proposed model and the data analysis strategy performs well. When the logistic model is correct, this more complex model has hardly any efficiency loss. The three-parameter logistic model works better than the two-parameter logistic model in the presence of model mis-specification.
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来源期刊
CiteScore
0.90
自引率
20.00%
发文量
21
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