Extension principle of interval-valued fuzzy set

被引：0

作者：

Zeng, Wenyi ^{[1
]}

Zhao, Yibin ^{[2
]}

Li, Hongxing ^{[2
]}

机构：

[1] Beijing Normal Univ, Sch Math Sci, Beijing 100875, Peoples R China

[2] Inst Disaster Prevent Sci & Technol, Dept Basic Course, Beijing 101601, Peoples R China

来源：

FUZZY INFORMATION AND ENGINEERING, PROCEEDINGS | 2007年 / 40卷

基金：

中国国家自然科学基金;

关键词：

interval-valued fuzzy set; extension principle; reasonable extension operator;

D O I：

暂无

中图分类号：

TP18 [人工智能理论];

学科分类号：

081104 ; 0812 ; 0835 ; 1405 ;

摘要：

In this paper, we introduce maximal and minimal extension principles of interval-valued fuzzy set and an axiomatic definition of generalized extension principle of interval-valued fuzzy set and use concepts of cut set of interval valued fuzzy set and interval-valued nested sets to explain their construction procedure in detail. These conclusions can be applied in some fields such as fuzzy algebra, fuzzy analysis and so on.

引用

页码：125 / +

页数：2

共 24 条

[1] INTERVAL-VALUED FUZZY BACKWARD REASONING [J].

ARNOULD, T ;

TANO, S .

IEEE TRANSACTIONS ON FUZZY SYSTEMS, 1995, 3 (04) :425-437

[2]

Atanassov K. T., 1999, INTUITIONISTIC FUZZY

[3] INTUITIONISTIC FUZZY-SETS [J].

ATANASSOV, KT .

FUZZY SETS AND SYSTEMS, 1986, 20 (01) :87-96

[4] ROSENFELD FUZZY SUBGROUPS WITH INTERVAL-VALUED MEMBERSHIP FUNCTIONS [J].

BISWAS, R .

FUZZY SETS AND SYSTEMS, 1994, 63 (01) :87-90

[5] Indicator of inclusion grade for interval-valued fuzzy sets. Application to approximate reasoning based on interval-valued fuzzy sets [J].

Bustince, H .

INTERNATIONAL JOURNAL OF APPROXIMATE REASONING, 2000, 23 (03) :137-209

[6] Mathematical analysis of interval-valued fuzzy relations: Application to approximate reasoning [J].

Bustince, H ;

Burillo, P .

FUZZY SETS AND SYSTEMS, 2000, 113 (02) :205-219

[7] Bidirectional approximate reasoning based on interval-valued fuzzy sets [J].

Chen, SM ;

Hsiao, WH ;

Jong, WT .

FUZZY SETS AND SYSTEMS, 1997, 91 (03) :339-353

[8] Bidirectional approximate reasoning for rule-based systems using interval-valued fuzzy sets [J].

Chen, SM ;

Hsiao, WH .

FUZZY SETS AND SYSTEMS, 2000, 113 (02) :185-203

[9] Implication in intuitionistic fuzzy and interval-valued fuzzy set theory: construction, classification, application [J].

Cornelis, C ;

Deschrijver, G ;

Kerre, EE .

INTERNATIONAL JOURNAL OF APPROXIMATE REASONING, 2004, 35 (01) :55-95

[10] On the relationship between some extensions of fuzzy set theory [J].

Deschrijver, G ;

Kerre, EE .

FUZZY SETS AND SYSTEMS, 2003, 133 (02) :227-235

← 1 2 3 →