English

Identifying Consistent Statements about Numerical Data with Dispersion-Corrected Subgroup Discovery

Artificial Intelligence 2017-07-06 v2 Databases

Abstract

Existing algorithms for subgroup discovery with numerical targets do not optimize the error or target variable dispersion of the groups they find. This often leads to unreliable or inconsistent statements about the data, rendering practical applications, especially in scientific domains, futile. Therefore, we here extend the optimistic estimator framework for optimal subgroup discovery to a new class of objective functions: we show how tight estimators can be computed efficiently for all functions that are determined by subgroup size (non-decreasing dependence), the subgroup median value, and a dispersion measure around the median (non-increasing dependence). In the important special case when dispersion is measured using the average absolute deviation from the median, this novel approach yields a linear time algorithm. Empirical evaluation on a wide range of datasets shows that, when used within branch-and-bound search, this approach is highly efficient and indeed discovers subgroups with much smaller errors.

Keywords

Cite

@article{arxiv.1701.07696,
  title  = {Identifying Consistent Statements about Numerical Data with Dispersion-Corrected Subgroup Discovery},
  author = {Mario Boley and Bryan R. Goldsmith and Luca M. Ghiringhelli and Jilles Vreeken},
  journal= {arXiv preprint arXiv:1701.07696},
  year   = {2017}
}

Comments

significance of empirical results tested; additional illustrations; table of used notations

R2 v1 2026-06-22T18:01:16.612Z