The definition of the degree of arity ≤ n about M-fuzzifying convex space is introduced in this paper. It can be viewed as a generalization of arity ≤ n and M- ...
[24] A convex structure (X, C) is of arity ≤ n provided its convex sets are precisely the sets with the property that co(F) ⊆ C for each subset F with. |F| ≤ n.
Oct 22, 2024 · This paper introduces a special Galois connection combined with the wedge-below relation. Furthermore, by using this tool, it is shown that ...
... M-fuzzifying convex structures, where each subset can be regarded as a convex set to some degree. Further, many properties of M-fuzzifying convex structures ...
In this paper, we introduce the degree to which a mapping C:LX⟶M is an (L, M)-fuzzy convexity. When (X,CX) and (Y,CY) are (L, M)-fuzzy convex spaces to some ...
From the view of arity and hull operator, we study the relations between the disjoint sum of M-fuzzifying convex spaces and its factor spaces. We also examine.
Also, it is proved that an M-fuzzifying convex structure which has M-fuzzifying JHC property is of arity ≤ 2 and that the segment operator of an M-fuzzifying ...
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In this paper, by means of the implication operator → on a completely distributive lattice M , we define the approximate degrees of M -fuzzifying convex ...
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[PDF] M-fuzzifying rough sets via M-fuzzifying algebraic relations
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([23]) An M-fuzzifying convex structure C on U is called an n-arity convex structure (n ∈ N), if coC(A) = WF∈Pf in(A),|F|≤n coC(F) for any A ∈ P(U) where |F| is ...
A degree approach to special mappings between M-fuzzifying convex spaces. Special Section: Recent Advances in Machine Learning and Soft Computing. Based on a ...
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