计数的非参数图形模型。

IF 4.3 3区 计算机科学 Q1 AUTOMATION & CONTROL SYSTEMS
Journal of Machine Learning Research Pub Date : 2020-12-01
Arkaprava Roy, David B Dunson
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引用次数: 0

摘要

尽管在许多应用领域中经常收集多变量计数数据,但令人惊讶的是,很少有工作开发灵活的模型来表征它们的依赖结构。当兴趣集中在推断条件独立图时,这一点尤其正确。本文提出了一类新的多元计数向量联合分布的成对马尔可夫随机场模型。通过采用一种新颖的变换,我们避免了对非负依赖结构的限制或通过截断引起的其他限制。采用贝叶斯方法进行推理,我们为随机效应的分布选择了一个Dirichlet过程,以在规范中诱导很大的灵活性。提出了一种有效的后验计算马尔可夫链蒙特卡罗算法。我们证明了各种理论性质,包括后验一致性,并表明我们的计数非参数图形分析(CONGA)方法在模拟研究中相对于竞争对手具有良好的性能。这些方法的动机来自于对小鼠神经元尖峰计数数据的应用。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Nonparametric graphical model for counts.

Nonparametric graphical model for counts.

Nonparametric graphical model for counts.

Nonparametric graphical model for counts.

Although multivariate count data are routinely collected in many application areas, there is surprisingly little work developing flexible models for characterizing their dependence structure. This is particularly true when interest focuses on inferring the conditional independence graph. In this article, we propose a new class of pairwise Markov random field-type models for the joint distribution of a multivariate count vector. By employing a novel type of transformation, we avoid restricting to non-negative dependence structures or inducing other restrictions through truncations. Taking a Bayesian approach to inference, we choose a Dirichlet process prior for the distribution of a random effect to induce great flexibility in the specification. An efficient Markov chain Monte Carlo (MCMC) algorithm is developed for posterior computation. We prove various theoretical properties, including posterior consistency, and show that our COunt Nonparametric Graphical Analysis (CONGA) approach has good performance relative to competitors in simulation studies. The methods are motivated by an application to neuron spike count data in mice.

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来源期刊
Journal of Machine Learning Research
Journal of Machine Learning Research 工程技术-计算机:人工智能
CiteScore
18.80
自引率
0.00%
发文量
2
审稿时长
3 months
期刊介绍: The Journal of Machine Learning Research (JMLR) provides an international forum for the electronic and paper publication of high-quality scholarly articles in all areas of machine learning. All published papers are freely available online. JMLR has a commitment to rigorous yet rapid reviewing. JMLR seeks previously unpublished papers on machine learning that contain: new principled algorithms with sound empirical validation, and with justification of theoretical, psychological, or biological nature; experimental and/or theoretical studies yielding new insight into the design and behavior of learning in intelligent systems; accounts of applications of existing techniques that shed light on the strengths and weaknesses of the methods; formalization of new learning tasks (e.g., in the context of new applications) and of methods for assessing performance on those tasks; development of new analytical frameworks that advance theoretical studies of practical learning methods; computational models of data from natural learning systems at the behavioral or neural level; or extremely well-written surveys of existing work.
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