Bayesian discrete conditional transformation models

IF 1.2 4区数学 Q2 STATISTICS & PROBABILITY

Statistical Modelling Pub Date : 2022-05-17 DOI:10.1177/1471082x221114177

Manuel Carlan, T. Kneib

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引用次数: 1

Abstract

We propose a novel Bayesian model framework for discrete ordinal and count data based on conditional transformations of the responses. The conditional transformation function is estimated from the data in conjunction with an a priori chosen reference distribution. For count responses, the resulting transformation model is novel in the sense that it is a Bayesian fully parametric yet distribution-free approach that can additionally account for excess zeros with additive transformation function specifications. For ordinal categoric responses, our cumulative link transformation model allows the inclusion of linear and non-linear covariate effects that can additionally be made category-specific, resulting in (non-)proportional odds or hazards models and more, depending on the choice of the reference distribution. Inference is conducted by a generic modular Markov chain Monte Carlo algorithm where multivariate Gaussian priors enforce specific properties such as smoothness on the functional effects. To illustrate the versatility of Bayesian discrete conditional transformation models, applications to counts of patent citations in the presence of excess zeros and on treating forest health categories in a discrete partial proportional odds model are presented.

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贝叶斯离散条件变换模型

我们提出了一种基于响应条件变换的离散有序和计数数据的贝叶斯模型框架。条件变换函数是根据数据和一个先验选择的参考分布来估计的。对于计数响应，由此产生的转换模型在某种意义上是新颖的，因为它是贝叶斯全参数但无分布的方法，可以用加性转换函数规范额外地解释多余的零。对于有序的分类响应，我们的累积链接转换模型允许包含线性和非线性协变量效应，这些效应还可以根据参考分布的选择进行分类，从而产生(非)比例的几率或风险模型等。推理是通过一个通用的模块化马尔可夫链蒙特卡罗算法进行的，其中多元高斯先验在函数效果上强制执行特定的属性，如平滑性。为了说明贝叶斯离散条件变换模型的通用性，本文介绍了在存在多余零的情况下专利引用计数和在离散部分比例赔率模型中处理森林健康类别的应用。

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

Statistical Modelling 数学-统计学与概率论

CiteScore

2.20

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： The primary aim of the journal is to publish original and high-quality articles that recognize statistical modelling as the general framework for the application of statistical ideas. Submissions must reflect important developments, extensions, and applications in statistical modelling. The journal also encourages submissions that describe scientifically interesting, complex or novel statistical modelling aspects from a wide diversity of disciplines, and submissions that embrace the diversity of applied statistical modelling.