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Uniform continuity in sequentially uniform spaces. (English) Zbl 0819.54014

The authors prove that every uniformly sequential uniform space is proximally fine, i.e., it is the finest uniform space inducing its proximity (no references to this result are given; it was proved e.g. by N. S. Ramm and A. S. Shvarts [Mat. Sb., Nov. Ser. 33(75), 157-180 (1952; Zbl 0050.391)]). Two consequences are given describing when a uniformly sequential space is topologically fine (both consequences, except the fourth condition in the second one, are valid for any proximally fine space).
Reviewer: M.Hušek (Praha)

MSC:

54E15 Uniform structures and generalizations

Citations:

Zbl 0050.391
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References:

[1] M. Atsuji, Uniform continuity of continuous functions of metric spaces,Pacific J. Math.,8 (1958), 11–16. · Zbl 0082.16207
[2] G. Beer, Metric spaces on which continuous functions are uniformly continuous and Hausdorff distance,Proc. Amer. Math. Soc.,95 (1985), 653–658. · Zbl 0594.54007 · doi:10.1090/S0002-9939-1985-0810180-3
[3] A. Di Concilio and S. A. Naimpally, Atsuji spaces: continuity versus uniform continuity, inProc. of VI. Brazilian Topology Meeting, Campinas, Sao Paolo, August, 1988.
[4] M. Hušek, Sequential uniform spaces,Proceedings of the Conference on Convergences, Bechyne, Czechoslovakia, 1984, pp. 177–188.
[5] S. A. Naimpally and B. D. Warrack,Proximity Spaces, Cambridge University Press, 1970.
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