DocumentCode
3401662
Title
Transformation Based Interpolation with Generalized Representative Values
Author
Huang, Zhiheng ; Shen, Qiang
Author_Institution
Sch. of Informatics, Edinburgh Univ.
fYear
2005
fDate
25-25 May 2005
Firstpage
821
Lastpage
826
Abstract
Fuzzy interpolation offers the potential to model problems with sparse rule bases, as opposed to dense rule bases deployed in traditional fuzzy systems. It thus supports the simplification of complex fuzzy models and facilitates inferences when only limited knowledge is available. This paper first introduces the general concept of representative values (RVs), and then uses it to present an interpolative reasoning method which can be used to interpolate fuzzy rules involving arbitrary polygonal fuzzy sets, by means of scale and move transformations. Various interpolation results over different RV implementations are illustrated to show the flexibility and diversity of this method. A realistic application shows that the interpolation-based inference can outperform the conventional inferences
Keywords
fuzzy reasoning; fuzzy set theory; fuzzy systems; interpolation; knowledge based systems; fuzzy inference; fuzzy models; fuzzy rule interpolation; fuzzy systems; generalized representative values; interpolative reasoning; polygonal fuzzy sets; sparse rule bases; transformation based interpolation; Computer science; Diversity methods; Fuzzy reasoning; Fuzzy sets; Fuzzy systems; Informatics; Interpolation;
fLanguage
English
Publisher
ieee
Conference_Titel
Fuzzy Systems, 2005. FUZZ '05. The 14th IEEE International Conference on
Conference_Location
Reno, NV
Print_ISBN
0-7803-9159-4
Type
conf
DOI
10.1109/FUZZY.2005.1452500
Filename
1452500
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