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- Moore_space_(topology) abstract "In mathematics, more specifically point-set topology, a Moore space is a developable regular Hausdorff space. Equivalently, a topological space X is a Moore space if the following conditions hold: Any two distinct points can be separated by neighbourhoods, and any closed set and any point in its complement can be separated by neighbourhoods. (X is a regular Hausdorff space.) There is a countable collection of open covers of X, such that for any closed set C and any point p in its complement there exists a cover in the collection such that every neighbourhood of p in the cover is disjoint from C. (X is a developable space.)Moore spaces are generally interesting in mathematics because they may be applied to prove interesting metrization theorems. The concept of a Moore space was formulated by R. L. Moore in the earlier part of the 20th century.".
- Moore_space_(topology) wikiPageID "8016525".
- Moore_space_(topology) wikiPageRevisionID "596219457".
- Moore_space_(topology) hasPhotoCollection Moore_space_(topology).
- Moore_space_(topology) id "6496".
- Moore_space_(topology) title "Moore space".
- Moore_space_(topology) subject Category:General_topology.
- Moore_space_(topology) comment "In mathematics, more specifically point-set topology, a Moore space is a developable regular Hausdorff space. Equivalently, a topological space X is a Moore space if the following conditions hold: Any two distinct points can be separated by neighbourhoods, and any closed set and any point in its complement can be separated by neighbourhoods.".
- Moore_space_(topology) label "Moore space (topology)".
- Moore_space_(topology) sameAs m.026nnmq.
- Moore_space_(topology) sameAs Q6908267.
- Moore_space_(topology) sameAs Q6908267.
- Moore_space_(topology) wasDerivedFrom Moore_space_(topology)?oldid=596219457.
- Moore_space_(topology) isPrimaryTopicOf Moore_space_(topology).