关于均值最优稳健线性判别分析

IF 4 3区 计算机科学 Q1 COMPUTER SCIENCE, INFORMATION SYSTEMS
Xiangyu Li, Hua Wang
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引用次数: 0

摘要

线性判别分析(LDA)被广泛用于监督学习环境下的降维。传统的线性判别分析目标旨在最小化欧几里得距离平方的比值,但在噪声数据集上可能无法达到最佳效果。为了解决这个问题,人们提出了多种鲁棒 LDA 目标,但它们的实现有两大局限。其一是它们的均值计算使用平方(\ell_{2}\)-正态距离来对数据进行居中,而当目标依赖于其他距离函数时,这种方法是无效的。第二个问题是没有通用的优化算法来解决不同的鲁棒 LDA 目标。此外,大多数现有算法只能保证解为局部最优,而非全局最优。本文回顾了多种鲁棒损失函数,并提出了一种新的通用鲁棒 LDA 目标。此外,为了更好地去除数据内部的平均值,我们的目标采用了一种通过学习使数据居中的最优方法。作为算法方面的一项重要贡献,我们推导出了一种高效的迭代算法,用于优化由此产生的非平滑和非凸目标函数。我们从理论上证明,我们的求解算法能保证目标和求解序列以亚线性收敛速度收敛到全局最优解。综合实验评估的结果证明了我们的新方法的有效性,与其他竞争方法相比取得了显著的改进。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
On Mean-Optimal Robust Linear Discriminant Analysis

Linear discriminant analysis (LDA) is widely used for dimensionality reduction under supervised learning settings. Traditional LDA objective aims to minimize the ratio of the squared Euclidean distances that may not perform optimally on noisy datasets. Multiple robust LDA objectives have been proposed to address this problem, but their implementations have two major limitations. One is that their mean calculations use the squared \(\ell_{2}\)-norm distance to center the data, which is not valid when the objective depends on other distance functions. The second problem is that there is no generalized optimization algorithm to solve different robust LDA objectives. In addition, most existing algorithms can only guarantee the solution to be locally optimal, rather than globally optimal. In this paper, we review multiple robust loss functions and propose a new and generalized robust objective for LDA. Besides, to better remove the mean value within data, our objective uses an optimal way to center the data through learning. As one important algorithmic contribution, we derive an efficient iterative algorithm to optimize the resulting non-smooth and non-convex objective function. We theoretically prove that our solution algorithm guarantees that both the objective and the solution sequences converge to globally optimal solutions at a sub-linear convergence rate. The results of comprehensive experimental evaluations demonstrate the effectiveness of our new method, achieving significant improvements compared to the other competing methods.

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来源期刊
ACM Transactions on Knowledge Discovery from Data
ACM Transactions on Knowledge Discovery from Data COMPUTER SCIENCE, INFORMATION SYSTEMS-COMPUTER SCIENCE, SOFTWARE ENGINEERING
CiteScore
6.70
自引率
5.60%
发文量
172
审稿时长
3 months
期刊介绍: TKDD welcomes papers on a full range of research in the knowledge discovery and analysis of diverse forms of data. Such subjects include, but are not limited to: scalable and effective algorithms for data mining and big data analysis, mining brain networks, mining data streams, mining multi-media data, mining high-dimensional data, mining text, Web, and semi-structured data, mining spatial and temporal data, data mining for community generation, social network analysis, and graph structured data, security and privacy issues in data mining, visual, interactive and online data mining, pre-processing and post-processing for data mining, robust and scalable statistical methods, data mining languages, foundations of data mining, KDD framework and process, and novel applications and infrastructures exploiting data mining technology including massively parallel processing and cloud computing platforms. TKDD encourages papers that explore the above subjects in the context of large distributed networks of computers, parallel or multiprocessing computers, or new data devices. TKDD also encourages papers that describe emerging data mining applications that cannot be satisfied by the current data mining technology.
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