Refined Statistical Bounds for Classification Error Mismatches with Constrained Bayes Error
Abstract
In statistical classification/multiple hypothesis testing and machine learning, a model distribution estimated from the training data is usually applied to replace the unknown true distribution in the Bayes decision rule, which introduces a mismatch between the Bayes error and the model-based classification error. In this work, we derive the classification error bound to study the relationship between the Kullback-Leibler divergence and the classification error mismatch. We first reconsider the statistical bounds based on classification error mismatch derived in previous works, employing a different method of derivation. Then, motivated by the observation that the Bayes error is typically low in machine learning tasks like speech recognition and pattern recognition, we derive a refined Kullback-Leibler-divergence-based bound on the error mismatch with the constraint that the Bayes error is lower than a threshold.
Cite
@article{arxiv.2409.01309,
title = {Refined Statistical Bounds for Classification Error Mismatches with Constrained Bayes Error},
author = {Zijian Yang and Vahe Eminyan and Ralf Schlüter and Hermann Ney},
journal= {arXiv preprint arXiv:2409.01309},
year = {2024}
}
Comments
accepted at 2024 IEEE Information Theory Workshop