English

Finding the True Frequent Itemsets

Machine Learning 2014-01-23 v3 Databases Data Structures and Algorithms Machine Learning

Abstract

Frequent Itemsets (FIs) mining is a fundamental primitive in data mining. It requires to identify all itemsets appearing in at least a fraction θ\theta of a transactional dataset D\mathcal{D}. Often though, the ultimate goal of mining D\mathcal{D} is not an analysis of the dataset \emph{per se}, but the understanding of the underlying process that generated it. Specifically, in many applications D\mathcal{D} is a collection of samples obtained from an unknown probability distribution π\pi on transactions, and by extracting the FIs in D\mathcal{D} one attempts to infer itemsets that are frequently (i.e., with probability at least θ\theta) generated by π\pi, which we call the True Frequent Itemsets (TFIs). Due to the inherently stochastic nature of the generative process, the set of FIs is only a rough approximation of the set of TFIs, as it often contains a huge number of \emph{false positives}, i.e., spurious itemsets that are not among the TFIs. In this work we design and analyze an algorithm to identify a threshold θ^\hat{\theta} such that the collection of itemsets with frequency at least θ^\hat{\theta} in D\mathcal{D} contains only TFIs with probability at least 1δ1-\delta, for some user-specified δ\delta. Our method uses results from statistical learning theory involving the (empirical) VC-dimension of the problem at hand. This allows us to identify almost all the TFIs without including any false positive. We also experimentally compare our method with the direct mining of D\mathcal{D} at frequency θ\theta and with techniques based on widely-used standard bounds (i.e., the Chernoff bounds) of the binomial distribution, and show that our algorithm outperforms these methods and achieves even better results than what is guaranteed by the theoretical analysis.

Keywords

Cite

@article{arxiv.1301.1218,
  title  = {Finding the True Frequent Itemsets},
  author = {Matteo Riondato and Fabio Vandin},
  journal= {arXiv preprint arXiv:1301.1218},
  year   = {2014}
}

Comments

13 pages, Extended version of work appeared in SIAM International Conference on Data Mining, 2014

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