支持向量回归的几何方法及其在发酵过程快速建模中的应用

Chinese Journal of Chemical Engineering ›› 2012, Vol. 20 ›› Issue (4): 715-722.

支持向量回归的几何方法及其在发酵过程快速建模中的应用

王建林, 冯絮影, 于涛

College of Information Science and Technology, Beijing University of Chemical Technology, Beijing 100029, China

收稿日期:2011-03-12 修回日期:2011-06-08 出版日期:2012-08-28 发布日期:2011-06-08

A geometric approach to support vector regression and its application to fermentation process fast modeling

WANG Jianlin, FENG Xuying, YU Tao

College of Information Science and Technology, Beijing University of Chemical Technology, Beijing 100029, China

Received:2011-03-12 Revised:2011-06-08 Online:2012-08-28 Published:2011-06-08

摘要/Abstract

摘要： Support vector machine (SVM) has shown great potential in pattern recognition and regressive estimation. Due to the industrial development demands, such as the fermentation process modeling, improving the training performance on increasingly large sample sets is an important problem. However, solving a large optimization problem is computationally intensive and memory intensive. In this paper, a geometric interpretation of SVM re-gression (SVR) is derived, and μ-SVM is extended for both L1-norm and L2-norm penalty SVR. Further, Gilbert al-gorithm, a well-known geometric algorithm, is modified to solve SVR problems. Theoretical analysis indicates that the presented SVR training geometric algorithms have the same convergence and almost identical cost of computa-tion as their corresponding algorithms for SVM classification. Experimental results show that the geometric meth-ods are more efficient than conventional methods using quadratic programming and require much less memory.

关键词: support vector machine, pattern recognition, regressive estimation, geometric algorithms

Abstract: Support vector machine (SVM) has shown great potential in pattern recognition and regressive estimation. Due to the industrial development demands, such as the fermentation process modeling, improving the training performance on increasingly large sample sets is an important problem. However, solving a large optimization problem is computationally intensive and memory intensive. In this paper, a geometric interpretation of SVM re-gression (SVR) is derived, and μ-SVM is extended for both L1-norm and L2-norm penalty SVR. Further, Gilbert al-gorithm, a well-known geometric algorithm, is modified to solve SVR problems. Theoretical analysis indicates that the presented SVR training geometric algorithms have the same convergence and almost identical cost of computa-tion as their corresponding algorithms for SVM classification. Experimental results show that the geometric meth-ods are more efficient than conventional methods using quadratic programming and require much less memory.

Key words: support vector machine, pattern recognition, regressive estimation, geometric algorithms

王建林, 冯絮影, 于涛. 支持向量回归的几何方法及其在发酵过程快速建模中的应用[J]. Chinese Journal of Chemical Engineering, 2012, 20(4): 715-722.

WANG Jianlin, FENG Xuying, YU Tao. A geometric approach to support vector regression and its application to fermentation process fast modeling[J]. Chin.J.Chem.Eng., 2012, 20(4): 715-722.

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