分期树和不对称标记的 DAG

IF 0.9 4区 数学 Q3 STATISTICS & PROBABILITY
Metrika Pub Date : 2024-03-07 DOI:10.1007/s00184-024-00957-1
Gherardo Varando, Federico Carli, Manuele Leonelli
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引用次数: 0

摘要

贝叶斯网络是一类广泛使用的概率图形模型,能够利用底层图形的拓扑结构来表示相关变量之间的对称条件独立性。对于分类变量来说,贝叶斯网络可以看作是更为通用的分阶段树模型的特例,后者可以表示任何非对称的条件独立性。在这里,我们正式阐述了这两种模型之间的关系,并介绍了分阶段树的最小贝叶斯网络表示法,它可以用来直观地读取条件独立性。我们定义了一种新的标记图,称为 "不对称标记有向无环图",其边缘用标记表示任意两个随机变量之间的依赖类型。我们还提出了一种学习分阶段树的新算法,该算法只强制执行特定的非对称独立性子集。各种数据集说明了这一方法,突出了构建能更灵活地编码和表示非对称结构的模型的必要性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Staged trees and asymmetry-labeled DAGs

Staged trees and asymmetry-labeled DAGs

Bayesian networks are a widely-used class of probabilistic graphical models capable of representing symmetric conditional independence between variables of interest using the topology of the underlying graph. For categorical variables, they can be seen as a special case of the much more general class of models called staged trees, which can represent any non-symmetric conditional independence. Here we formalize the relationship between these two models and introduce a minimal Bayesian network representation of a staged tree, which can be used to read conditional independences intuitively. A new labeled graph termed asymmetry-labeled directed acyclic graph is defined, with edges labeled to denote the type of dependence between any two random variables. We also present a novel algorithm to learn staged trees which only enforces a specific subset of non-symmetric independences. Various datasets illustrate the methodology, highlighting the need to construct models that more flexibly encode and represent non-symmetric structures.

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来源期刊
Metrika
Metrika 数学-统计学与概率论
CiteScore
1.50
自引率
14.30%
发文量
39
审稿时长
6-12 weeks
期刊介绍: Metrika is an international journal for theoretical and applied statistics. Metrika publishes original research papers in the field of mathematical statistics and statistical methods. Great importance is attached to new developments in theoretical statistics, statistical modeling and to actual innovative applicability of the proposed statistical methods and results. Topics of interest include, without being limited to, multivariate analysis, high dimensional statistics and nonparametric statistics; categorical data analysis and latent variable models; reliability, lifetime data analysis and statistics in engineering sciences.
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