Statistical Consistency of Finite-dimensional Unregularized Linear Classification
Machine Learning
2012-06-15 v1 Machine Learning
Abstract
This manuscript studies statistical properties of linear classifiers obtained through minimization of an unregularized convex risk over a finite sample. Although the results are explicitly finite-dimensional, inputs may be passed through feature maps; in this way, in addition to treating the consistency of logistic regression, this analysis also handles boosting over a finite weak learning class with, for instance, the exponential, logistic, and hinge losses. In this finite-dimensional setting, it is still possible to fit arbitrary decision boundaries: scaling the complexity of the weak learning class with the sample size leads to the optimal classification risk almost surely.
Cite
@article{arxiv.1206.3072,
title = {Statistical Consistency of Finite-dimensional Unregularized Linear Classification},
author = {Matus Telgarsky},
journal= {arXiv preprint arXiv:1206.3072},
year = {2012}
}