广义摄动度及BKS推理方法的鲁棒性

Generalized perturbation degree and robustness of BKS reasoning method

下载PDF

导出

摘要针对用于研究模糊推理鲁棒性的模糊集摄动程度概念不统一的状况,提出了广义摄动度的概念,使文献中出现的多个概念成为新概念的特殊情形。基于提出的广义摄动度概念,系统研究了一些常用蕴涵和模糊连接词的摄动程度,给出了常用蕴涵和模糊连接词的广义摄动度,并且得到基于五个模糊蕴涵的Bandler-Kohout Subproduct(BKS)推理方法的鲁棒性结果。 Aiming at the situation that the concept of fuzzy set perturbation degree used to study the robustness of fuzzy reasoning is not uniform, the concept of generalized perturbation is proposed, which makes the multiple concepts appearing in the literature become special cases of the new concept. Based on the proposed concept of generalized perturbation degree, the perturbation degree of some commonly used implications and fuzzy connection words are systematically studied. The generalized perturbation of common implications and fuzzy connection words are given, and the robustness of the Bandler-Kohout Subproduct(BKS) reasoning method based on five fuzzy implications is obtained.

作者王媛媛裴道武 WANG Yuanyuan;PEI Daowu((School of Sciences,Zhejiang Sci-Tech University,Hangzhou 310018,China)

机构地区浙江理工大学理学院

出处《浙江理工大学学报（自然科学版）》 2019年第2期255-261,共7页 Journal of Zhejiang Sci-Tech University(Natural Sciences)

基金国家自然科学基金项目(11171308,61379018,61472471)

关键词模糊逻辑模糊推理摄动度广义摄动度 BKS推理方法鲁棒性 fuzzy logic fuzzy reasoning perturbation degree generalized perturbation degree BKS reasoning method robustness

分类号 O159 [理学—基础数学]

引文网络
相关文献

参考文献1

1王国俊,段景瑶.适宜于展开模糊推理的两类模糊度量空间[J].中国科学：信息科学,2014,44(5):623-632. 被引量：7

二级参考文献15

1Ying M S. Perturbation of fuzzy reasoning. IEEE Trans Fuzzy Syst, 1999, 7: 625-629.
2Zadeh L A. Outline of a new approach to the analysis of complex systems and decision processes. IEEE Trans Syst Man Cy B, 1973, 1 : 28-44.
3Cai K Y. Robustness of fuzzy reasoning and δ-equalities of fuzzy sets. IEEE Trans Fuzzy Syst, 2001, 9: 738-750.
4Li Y M, Li D C, W J J, et al. An approach of measure the robustness of fuzzy reasoning. Int J Intell Syst, 2005, 20: 393-413.
5Li Y F, Qin K Y, He X X. Robustness of fuzzy connectives and fuzzy reasoning. Fuzzy Syst, 2013, 225: 93-105.
6Dai S S, Pei D W, Wang S M. Perturbation of fuzzy sets and fuzzy reasoning based on normalized Minkowski distances. Fuzzy Syst, 2011, 189: 63-73.
7Luo M X, Yao N. Triple I algorithms based on Schweizer-Sklar operators in fuzzy reasoning. Int J Approx Reason, 2013, 54: 640-652.
8Jin J H, Li Y M, Li C Q. Robustness of fuzzy reasoniog via logically equivalence measure. Inform Sci, 2007, 177: 5103-5117.
9Dai S S, Pei D W, Guo D H. Robustness analysis of full implication inference method. Int J Approx Reason, 2013, 54: 653-666.
10Klement E P, Mesiar R, Pap E. Triangular Norms. Dordrecht: Kluwer Academic Publishers, 2000.

共引文献6

1杨亚锋.基于集对逻辑的近似推理方法研究[J].智能系统学报,2015,10(6):921-926. 被引量：4
2段景瑶,李永明.模糊集的逻辑等价相似度[J].陕西师范大学学报（自然科学版）,2016,44(1):7-13. 被引量：1
3郑顶伟,周敬人.模糊度量空间中的Meir-Keeler型定理[J].广西大学学报（自然科学版）,2017,42(6):2258-2263.
4李骏,付超.基于强正则蕴涵算子的加权模糊度量空间[J].计算机工程与应用,2017,53(5):31-35. 被引量：2
5李星宇,段景瑶.基于三角模的直觉相似度及其应用[J].山东大学学报（理学版）,2022,57(4):37-47. 被引量：1
6罗敏霞,徐东辉.区间值模糊推理的逻辑度量空间[J].智能系统学报,2023,18(3):613-618.

1张爱珍.核心素养背景下小学数学合情推理能力的培养策略[J].科教导刊（电子版）,2019,0(4):189-189.
2杨丽,覃锋.构造模糊蕴涵的新序和方法[J].江西师范大学学报（自然科学版）,2018,42(3):254-259. 被引量：3
3张研,王海博,王艺颖.基于模糊神经网络的数控机床故障诊断技术研究[J].黄河水利职业技术学院学报,2019,31(2):36-42. 被引量：3
4赵艳红.人工智能在刑事证明标准判断中的运用问题探讨[J].上海交通大学学报（哲学社会科学版）,2019,27(1):54-62. 被引量：16
5吴孝良,魏金萍.基于“类比推理”法的习题课教学[J].生物学教学,2019,44(4):77-79. 被引量：1
6李颖,周红军.(I,A)-蕴涵及其基本性质[J].计算机工程与应用,2019,55(8):59-65.
7肖俊华,徐耀玲,张福成.基于表面弹性理论的开裂椭圆孔断裂力学研究[J].固体力学学报,2019,40(1):82-89. 被引量：8
8李宏艳,李清华.RL-fuzzy拓扑及其模糊紧性[J].山东大学学报（理学版）,2019,54(2):51-56.

浙江理工大学学报（自然科学版）

2019年第2期

浏览历史

内容加载中请稍等...

广义摄动度及BKS推理方法的鲁棒性

参考文献1

二级参考文献15

共引文献6

相关作者

相关机构

相关主题

浏览历史