English

Test-cost-sensitive attribute reduction of data with normal distribution measurement errors

Artificial Intelligence 2013-06-04 v2

Abstract

The measurement error with normal distribution is universal in applications. Generally, smaller measurement error requires better instrument and higher test cost. In decision making based on attribute values of objects, we shall select an attribute subset with appropriate measurement error to minimize the total test cost. Recently, error-range-based covering rough set with uniform distribution error was proposed to investigate this issue. However, the measurement errors satisfy normal distribution instead of uniform distribution which is rather simple for most applications. In this paper, we introduce normal distribution measurement errors to covering-based rough set model, and deal with test-cost-sensitive attribute reduction problem in this new model. The major contributions of this paper are four-fold. First, we build a new data model based on normal distribution measurement errors. With the new data model, the error range is an ellipse in a two-dimension space. Second, the covering-based rough set with normal distribution measurement errors is constructed through the "3-sigma" rule. Third, the test-cost-sensitive attribute reduction problem is redefined on this covering-based rough set. Fourth, a heuristic algorithm is proposed to deal with this problem. The algorithm is tested on ten UCI (University of California - Irvine) datasets. The experimental results show that the algorithm is more effective and efficient than the existing one. This study is a step toward realistic applications of cost-sensitive learning.

Keywords

Cite

@article{arxiv.1210.0091,
  title  = {Test-cost-sensitive attribute reduction of data with normal distribution measurement errors},
  author = {Hong Zhao and Fan Min and William Zhu},
  journal= {arXiv preprint arXiv:1210.0091},
  year   = {2013}
}

Comments

This paper has been withdrawn by the author due to the error of the title

R2 v1 2026-06-21T22:13:17.317Z