JOURNAL OF SHANDONG UNIVERSITY(NATURAL SCIENCE) ›› 2015, Vol. 50 ›› Issue (08): 14-19.doi: 10.6040/j.issn.1671-9352.0.2014.540

Previous Articles     Next Articles

Potential influence of maximum interactive number on non-homogeneous T-S fuzzy system

SUO Chun-feng, WANG Gui-jun   

  1. School of Mathematics Sciences, Tianjin Normal University, Tianjin 300387, China
  • Received:2014-12-01 Online:2015-08-20 Published:2015-07-31

PDF (PC)

496

Abstract: Maximum interactive number is to describe the degree of density of the antecedent fuzzy sets. It is very important to the approximation problem of all kinds of fuzzy systems. Firstly, the non-homogeneous T-S fuzzy system is established by introducing piecewise linear function (PLF) and minimum inference engine again. Secondly, the effects of the maximum interactive number to this fuzzy system are explained based on the geometric intuitiveness, and the actual output value of the system can be calculated by changing maximum interactive number and randomly selecting sample points. The results show that the internal structure and values of the non-homogeneous T-S fuzzy system have potential influence to the maximum interactive number when the subdivision number is not changed.

Key words: maximum interactive number, piecewise linear function, non-homogeneous T-S fuzzy system

CLC Number: 

  • TP183
[1] TAKAGI T, SUGENO M. Fuzzy identification of system and its applications to modeling and control[J]. IEEE Transactions on Systems Man and Cybernetics,1985, 15(1):116-132.
[2] WANG Lixin, MENDEL J M. Fuzzy basis functions, universal approximation, and orthogonal least-squares learning[J]. IEEE Transanctions on Neural Networks, 1992, 3(5): 807-814.
[3] WANG Lixin. Universal approximation by hierarchical fuzzy systems[J]. Fuzzy Set and Systems, 1998, 93(2):223-230.
[4] 刘普寅,李洪兴.广义模糊系统对于可积函数的逼近性[J].中国科学:E辑 枝术科学,2000,30(5):413-423. LIU Puyin, Li Hongxing. Approximation of generalized fuzzy systems to integrable functions[J]. Science in China: Series E Technological Sciences, 2000, 30(5):413-423.
[5] 刘福才,马丽叶,邵静,等.一类非线性T-S模糊系统的通用逼近性[J].自动化与仪器仪表,2007, 129 (1):8-15. LIU Fucai, MA Liye, SHAO Jing, et al. Universal approximation of a class of nonlinear T-S fuzzy system[J]. Automation & Instrumentation, 2007, 129(1):8-15.
[6] 王贵君,段晨霞.广义分层混合模糊系统及其泛逼近性[J].控制理论与应用,2012, 29(5):673-680. WANG Guijun, DUAN Chenxia. Generalized hierarchical hybrid fuzzy systems and their universal approximation[J]. Control Theory & Applications, 2012, 29(5):673-680.
[7] 王贵君,李晓萍,隋晓琳.广义Mamdani模糊系统依K-积分模的泛逼近性及其实现过程[J].自动化学报,2014, 40(1):143-148. WANG Guijun, LI Xiaoping, SUI Xiaolin. Universal approximation and its realize process of generalized Mamdani fuzzy system in K-integral norms[J]. Acta Automatica Sinica, 2014, 40(1):143-148.
[8] 彭维玲.基于剖分模糊系统输入空间的多维分片线性函数的构造及逼近[J].系统科学与数学,2014,34 (3):340-351. PENG Weiling. Universal approximation of square piecewise linear functions in K-integral norms in fuzzy system[J]. Journal of Systems Science and Mathematical Sciences, 2014, 34(3):340-351.
[1] XIAO Wei-ming, WANG Gui-jun. Design and approximation of SISO three layers feedforward neural network based on Bernstein polynomials [J]. JOURNAL OF SHANDONG UNIVERSITY(NATURAL SCIENCE), 2018, 53(9): 55-61.
[2] TUN Rui-Hai, DONG Ji-Wen, DUAN Qi-Qiang. A scale chaos particle swarm optimization algorithm and the wavelet  in the forecast application of foundation settlement [J]. J4, 2009, 44(11): 75-78.
[3] . An online estimation algorithm of driver’s learning process [J]. J4, 2009, 44(7): 83-88.
[4] ZHU Shi-wei,SAI Ying . The prediction model of financial distress of Chinese listed corporations based on a hybrid RPR model [J]. J4, 2008, 43(11): 48-53 .
Viewed
Full text


Abstract

Cited
  Shared   
  Discussed   
No Suggested Reading articles found!
Copyright 2018 © Editorial office of JOURNAL OF SHANDONG UNIVERSITY(NATURAL SCIENCE)
Supported by Beijing Magtech Co.Ltd