Extensions of Closure Spaces

K. C. Chattopadhyay; W. J. Thron

doi:10.4153/CJM-1977-127-6

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Extension theory has been intensively studied for completely regular spaces and is fairly well developed for T0-topological spaces. (See, for example, [1] and [5]). However, except for definitions of some of the basic concepts in [4] and results on embedding of closure spaces in cubes in [2] and [7], ours is the first study of the general theory of extensions of G0-closure spaces. (Definitions will be given following these introductory paragraphs).

References

1. Banaschewski, B., Extensions of topological spaces, Can. Math. Bull. 7 (1964), 1–22.Google Scholar

2. Cech, E., Topological spaces, rev. ed. (Publ. House Czech. Acad. Sc. Prague, English transi. Wiley, New York, 1966).Google Scholar

3. Gagrat, M.S. and Naimpally, S. A., Proximity approach to extension problems, Fund. Math. 71 (1971), 63–76.Google Scholar

4. Gagrat, M. S. and Thron, W. J., Nearness structures and proximity extensions, Trans. Amer. Math. Soc. 208 (1975), 103–125.Google Scholar

5. Thron, W. J., Topological structures (Holt, Rinehart and Winston, New York, 1966).Google Scholar

6. Thron, W. J. Proximity structures and grills, Math. Ann. 206 (1973), 35–62.Google Scholar

7. Thron, W. J. and Warren, R. H., On the lattice of proximities of Cech compatible with a givenclosure space, Pac. J. Math. 49 (1973), 519–535.Google Scholar

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