序数回归
人工智能
序数数据
人工神经网络
计算机科学
回归
有序优化
秩(图论)
熵(时间箭头)
二元分类
机器学习
交叉熵
模式识别(心理学)
数学
统计
支持向量机
物理
组合数学
量子力学
作者
Wenzhi Cao,Vahid Mirjalili,Sebastian Raschka
标识
DOI:10.1016/j.patrec.2020.11.008
摘要
In many real-world prediction tasks, class labels include information about the relative ordering between labels, which is not captured by commonly-used loss functions such as multi-category cross-entropy. Recently, the deep learning community adopted ordinal regression frameworks to take such ordering information into account. Neural networks were equipped with ordinal regression capabilities by transforming ordinal targets into binary classification subtasks. However, this method suffers from inconsistencies among the different binary classifiers. To resolve these inconsistencies, we propose the COnsistent RAnk Logits (CORAL) framework with strong theoretical guarantees for rank-monotonicity and consistent confidence scores. Moreover, the proposed method is architecture-agnostic and can extend arbitrary state-of-the-art deep neural network classifiers for ordinal regression tasks. The empirical evaluation of the proposed rank-consistent method on a range of face-image datasets for age prediction shows a substantial reduction of the prediction error compared to the reference ordinal regression network.
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