2018
DOI: 10.31801/cfsuasmas.484924
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Local pre-Hausdorff extended pseudo-quasi-semi metric spaces

Abstract: In this paper, we characterize local pre-Hausdor¤ extended pseudoquasi-semi metric spaces and investigate the relationships between them. Finally, we show that local pre-Hausdor¤ extended pseudo-quasi-semi metric spaces are hereditary and productive.

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Cited by 4 publications
(5 citation statements)
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“…(2) Note that the full subcategory KT 2 (pqsMet) is isomorphism-closed. By Theorems 6 and 7 of [14] and Theorem 7, the full subcategory KT 2 (pqsMet) is epire- ‡ective in pqsMet. Finally, if (X; d) is the indiscrete extended pseudo-quasi-semi…”
Section: Localmentioning
confidence: 90%
See 2 more Smart Citations
“…(2) Note that the full subcategory KT 2 (pqsMet) is isomorphism-closed. By Theorems 6 and 7 of [14] and Theorem 7, the full subcategory KT 2 (pqsMet) is epire- ‡ective in pqsMet. Finally, if (X; d) is the indiscrete extended pseudo-quasi-semi…”
Section: Localmentioning
confidence: 90%
“…B _ p Bg coincide, then X is called a P reT 0 2 object at p. (4) If the initial lift of the U-sources Proof. The proof of (1) and (2) are given in [14].…”
Section: Localmentioning
confidence: 99%
See 1 more Smart Citation
“…The following are equivalent: Let be a topological category, X is an object of with p∈ ( ). Note that by [3,12] (ii) Note that all objects of a set-based arbitrary topological category may be ̅ 2 at p. For example, it is shown, in [13], that all Cauchy spaces [14] are ̅ 2 at p. Also, 2 ′ at objects could be only discrete objects [15]. (2) Suppose that ( = ∏ ∈ , ) is ̅ 3 at p. Since each ( , ) is isomorphic to a subspace of (B,K), by Part (1), ∀ ∈ , ( , ) is ̅ 3 at .…”
Section: Local T3 Constant Filter Convergence Spacesmentioning
confidence: 99%
“…′ at objects could be only discrete objects [15]. (2) Suppose that ( = ∏ ∈ , ) is ̅ 3 at p. Since each ( , ) is isomorphic to a subspace of (B,K), by Part (1), ∀ ∈ , ( , ) is ̅ 3 at .…”
mentioning
confidence: 99%