关系费舍尔分析:关系数据的降维与全局收敛

IF 1.8 Q3 COMPUTER SCIENCE, ARTIFICIAL INTELLIGENCE Algorithms Pub Date : 2023-11-15 DOI:10.3390/a16110522
Lina Wang, Guoqiang Zhong, Yaxin Shi, Mohamed Cheriet
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引用次数: 0

摘要

大多数降维算法都假设数据是独立且同分布的(i.i.d.)。但在实际应用中,数据之间有时会存在关系。目前已经提出了一些关系学习方法,但还缺乏具有判别关系分析的方法,因为重要的监督信息通常会被忽略。在本文中,我们提出了一个新颖的通用框架,称为关系费舍尔分析(RFA),它成功地将关系信息整合到了降维模型中。针对非线性数据表示学习,我们在 RFA 中采用了核技巧,并提出了核化 RFA(KRFA)。此外,我们还从理论上证明了 RFA 优化算法的收敛性。通过利用合适的策略构建关系矩阵,我们进行了大量实验,证明我们的 RFA 和 KRFA 方法优于相关方法。
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Relational Fisher Analysis: Dimensionality Reduction in Relational Data with Global Convergence
Most of the dimensionality reduction algorithms assume that data are independent and identically distributed (i.i.d.). In real-world applications, however, sometimes there exist relationships between data. Some relational learning methods have been proposed, but those with discriminative relationship analysis are lacking yet, as important supervisory information is usually ignored. In this paper, we propose a novel and general framework, called relational Fisher analysis (RFA), which successfully integrates relational information into the dimensionality reduction model. For nonlinear data representation learning, we adopt the kernel trick to RFA and propose the kernelized RFA (KRFA). In addition, the convergence of the RFA optimization algorithm is proved theoretically. By leveraging suitable strategies to construct the relational matrix, we conduct extensive experiments to demonstrate the superiority of our RFA and KRFA methods over related approaches.
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来源期刊
Algorithms
Algorithms Mathematics-Numerical Analysis
CiteScore
4.10
自引率
4.30%
发文量
394
审稿时长
11 weeks
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