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Bibliography on bitopological spaces. III
1995See the review in Zbl 0890.54028.
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1990
[For part II see the preceding review.] The author continues his study of bitopological spaces. This paper considers the following: connections between bitopologies and various asymmetric proximity relations, internal characterizations of complete regularity in bispaces, and compactifications of bispaces.
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[For part II see the preceding review.] The author continues his study of bitopological spaces. This paper considers the following: connections between bitopologies and various asymmetric proximity relations, internal characterizations of complete regularity in bispaces, and compactifications of bispaces.
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Journal of the London Mathematical Society, 1975
Cooke, Ian E., Reilly, Ivan L.
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Cooke, Ian E., Reilly, Ivan L.
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On separation axioms in fuzzy bitopological spaces
Fuzzy Sets and Systems, 1996zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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1979
Two procedures for extending topological or uniform space concepts to bitopological or quasi-uniform spaces are: (1) spanning subcategories or functors by suitable objects; (2) lifting epireflections. The main theorem relates Cauchy completions of functorial admissible (quasi-) uniformities to generalized compactness reflections.
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Two procedures for extending topological or uniform space concepts to bitopological or quasi-uniform spaces are: (1) spanning subcategories or functors by suitable objects; (2) lifting epireflections. The main theorem relates Cauchy completions of functorial admissible (quasi-) uniformities to generalized compactness reflections.
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2017
A bitopological space (X,τ,μ) is a set X with two topologies. The study of bitopological spaces was initiated by J. C. Kelly. In this thesis, we study pairwise-separation axioms as defined by J. C. Kelly, C. W. Patty, and F. P. Lane. In addition, definitions for semi-compactness, semi-paracompactness, and bicontinuous functions are proposed and are ...
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A bitopological space (X,τ,μ) is a set X with two topologies. The study of bitopological spaces was initiated by J. C. Kelly. In this thesis, we study pairwise-separation axioms as defined by J. C. Kelly, C. W. Patty, and F. P. Lane. In addition, definitions for semi-compactness, semi-paracompactness, and bicontinuous functions are proposed and are ...
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On level spaces of fuzzy bitopological spaces
Soft Computing, 2022M. Kameswari +4 more
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Problems of the theory of bitopological spaces. II
1995The first part [Zap. Nauchn. Semin. Leningr. Otd. Mat. Inst. Steklova 167, 5-62 (1988; Zbl 0685.54019)] of this work covers the period until 1986 inclusive and part of 1987. The second part, which we present here, mainly concerns the papers published in 1987-1990. It also replenishes the gaps concerning earlier papers, and touches some papers published
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