Open AccessHaar’ s Measure using Triangular Fuzzy Finite Topological Group
Author(s) -
G. Veeramalai,
P. Ramesh
Publication year - 2019
Publication title -
international journal of innovative technology and exploring engineering
Language(s) - English
Resource type - Journals
ISSN - 2278-3075
DOI - 10.35940/ijitee.k1862.0981119
Subject(s) - haar measure , mathematics , measure (data warehouse) , uniqueness , topological group , fuzzy logic , haar , fuzzy measure theory , group (periodic table) , invariant (physics) , fuzzy set , discrete mathematics , topology (electrical circuits) , pure mathematics , combinatorics , algebra over a field , fuzzy number , mathematical analysis , artificial intelligence , computer science , physics , data mining , quantum mechanics , wavelet , mathematical physics
In this paper, A new approach is used to apply Haar’s measure theory to triangular fuzzy number theory for comprehending and generalizing the uniqueness of invariant measure when there are uncertainty and risk. If T ~ is a triangular fuzzy finite Topological group and X ~ is its subgroup, X ~ also being a triangular fuzzy number, then )
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