On Extremal Topology
DOI:
https://doi.org/10.55276/ljs.v19iB.160Abstract
Extremal topology was defined on an arbitrary set as a maximal non-discrete topology [2]. In this paper we will prove that every extremal topology on a set X has to be of the form , for some and some ultrafilter in . Where is the power set of . We also show that if is a free ultrafilter then is a space.
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Published
2016-11-29
How to Cite
Sola, M. A. . (2016) “On Extremal Topology”, The Libyan Journal of Science, 19(B), pp. 39–42. doi: 10.55276/ljs.v19iB.160.
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Section
Mathematics
