Resolvable space

In topology, a topological space is said to be resolvable if it is expressible as the union of two disjoint dense subsets. For instance, the real numbers form a resolvable topological space because the rationals and irrationals are disjoint dense subsets. A topological space that is not resolvable is termed irresolvable.

Properties

• The product of two resolvable spaces is resolvable
• Every locally compact topological space without isolated points is resolvable
• Every submaximal space is irresolvable

See also

• Glossary of topology

Reference

• A.B. Kharazishvili (2006), Strange functions in real analysis, Chapman & Hall/CRC monographs and surveys in pure and applied mathematics, 272, CRC Press, p. 74, ISBN 1584885823 
• Miroslav Hušek; J. van Mill (2002), Recent progress in general topology, Recent Progress in General Topology, 2, Elsevier, p. 21, ISBN 0444509801