Probably the best itemsets

Proceedings of the 16th ACM SIGKDD international conference on Knowledge discovery and data mining Pub Date : 2010-07-25 DOI:10.1145/1835804.1835843

Nikolaj Tatti

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引用次数: 28

Abstract

One of the main current challenges in itemset mining is to discover a small set of high-quality itemsets. In this paper we propose a new and general approach for measuring the quality of itemsets. The method is solidly founded in Bayesian statistics and decreases monotonically, allowing for efficient discovery of all interesting itemsets. The measure is defined by connecting statistical models and collections of itemsets. This allows us to score individual itemsets with the probability of them occuring in random models built on the data. As a concrete example of this framework we use exponential models. This class of models possesses many desirable properties. Most importantly, Occam's razor in Bayesian model selection provides a defence for the pattern explosion. As general exponential models are infeasible in practice, we use decomposable models; a large sub-class for which the measure is solvable. For the actual computation of the score we sample models from the posterior distribution using an MCMC approach. Experimentation on our method demonstrates the measure works in practice and results in interpretable and insightful itemsets for both synthetic and real-world data.

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可能是最好的道具集

当前项目集挖掘的主要挑战之一是发现一小部分高质量的项目集。在本文中，我们提出了一种新的和通用的方法来测量项目集的质量。该方法牢固地建立在贝叶斯统计和单调递减，允许有效地发现所有感兴趣的项目集。度量通过连接统计模型和项集集合来定义。这使我们能够根据它们在基于数据的随机模型中出现的概率对单个项目集进行评分。作为这个框架的一个具体例子，我们使用指数模型。这类模型具有许多令人满意的特性。最重要的是，贝叶斯模型选择中的奥卡姆剃刀为模式爆炸提供了一个防御。由于一般的指数模型在实际中是不可行的，我们使用可分解模型;度量是可解的一个大子类。对于分数的实际计算，我们使用MCMC方法从后验分布中抽样模型。对我们的方法进行的实验表明，该方法在实践中是有效的，并且对合成数据和真实数据都产生了可解释和有见地的项集。

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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Proceedings of the 16th ACM SIGKDD international conference on Knowledge discovery and data mining

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