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On Large Inductive Dimension of Proximity Spaces
Published online by Cambridge University Press: 20 November 2018
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The notion of proximity spaces was introduced by Efremovic in [2, 3]. An analysis of proximity spaces was carried out by Smirnov in [5].
The study of covering dimension of proximity spaces was originated by Smirnov in [6].
In this paper we introduce the concept of δ-large inductive dimension of proximity spaces and study some of its properties.
1. Definitions and basic concepts.
Definition 1. [5]A proximity space or (δ-space) is a pair (X, δ) where X is a set and δ is a mapping from 2X × 2X into the set {0, 1} satisfying the following axioms:
1. δ(A, B) = δ(B, A)∀ A, B ∊ 2X.
2. δ(A, B ∪ C) = δ(A, B) δ(A, C) ∀ A, B, C ∊ 2X
3. δ({x}, {y}) = 0 ⇔ x = y.
4. δ(X, ∅) = 1.
5. δ(A, B) = 1 ⇒ ∃ C, D ∊ 2X ∋ C ∪ D = X and δ(A, C) · δ(B, C) = 1.
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- Research Article
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- Copyright © Canadian Mathematical Society 1983
References
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Naimpally, S. A. and Warrack, B. D., Proximity spaces (Cambridge University Press, 1970).Google Scholar
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Smirnov, Ju. M., On proximity spaces,
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21 (1962), 1–20.Google Scholar
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Smirnov, Ju. M., On dimension of remainder of compact extension of proximity and topological spaces,
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69 (1966), 141–159.Google Scholar
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