Ordered discrete and continuous Z-numbers
Both discrete and continuous Z-numbers are pairs of discrete and continuous fuzzy numbers. Even though the later are ordered, this do not simply imply the discrete and continuous Z-numbers are ordered as well. This paper proposed the idea of ordered discrete and continuous Z-numbers, which are neces...
Main Authors: | , , |
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Format: | Article |
Language: | English |
Published: |
Penerbit UTM Press
2020
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Subjects: | |
Online Access: | http://eprints.utm.my/91264/1/MujahidAbdullahi2020_OrderedDiscreteandContinuousZ-Numbers.pdf |
Summary: | Both discrete and continuous Z-numbers are pairs of discrete and continuous fuzzy numbers. Even though the later are ordered, this do not simply imply the discrete and continuous Z-numbers are ordered as well. This paper proposed the idea of ordered discrete and continuous Z-numbers, which are necessary properties for constructing temporal Z-numbers. Linear ordering relation, ≺, is applied between set of discrete or continuous Z-numbers and any arbitrary ordered subset of ℝ to obtain the properties. |
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