Connectedness in topological linear spaces |
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| Authors: | Victor Klee |
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| Affiliation: | (1) University of Washington, Seattle, Washington |
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| Abstract: | ![]()
The following properties, well known for normed linear spaces of dimension ≧2, are established for an arbitrary topological linear space of dimension ≧2: (a) every neighborhood of 0 contains one whose complement is connected; (b) the complement of a bounded set has exactly one unbounded component. Research supported by the National Science Foundation, U.S.A. (NSF-GP-378). |
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