Delta-Closure Structure for Studying Data Distribution
Abstract
In this paper, we revisit pattern mining and study the distribution underlying a binary dataset thanks to the closure structure which is based on passkeys, i.e., minimum generators in equivalence classes robust to noise. We introduce -closedness, a generalization of the closure operator, where measures how a closed set differs from its upper neighbors in the partial order induced by closure. A -class of equivalence includes minimum and maximum elements and allows us to characterize the distribution underlying the data. Moreover, the set of -classes of equivalence can be partitioned into the so-called -closure structure. In particular, a -class of equivalence with a high level demonstrates correlations among many attributes, which are supported by more observations when is large. In the experiments, we study the -closure structure of several real-world datasets and show that this structure is very stable for large and does not substantially depend on the data sampling used for the analysis.
Keywords
Cite
@article{arxiv.2210.06926,
title = {Delta-Closure Structure for Studying Data Distribution},
author = {Aleksey Buzmakov and Tatiana Makhalova and Sergei O. Kuznetsov and Amedeo Napoli},
journal= {arXiv preprint arXiv:2210.06926},
year = {2022}
}