Ordered discrete and continuous Z-numbers

• Main Authors: Abdullahi, Mujahid (Author), Ahmad, Tahir (Author), Ramachandran, Vinod (Author)
• Format: Article
• Language: English
• Published: Penerbit UTM Press, 2020-07.
• Subjects: QA Mathematics
• Online Access: Get fulltext

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.