unicoherent space

In mathematics, a unicoherent space is a topological space $X$ that is connected and in which the following property holds:

For any closed, connected $A, B \subset X$ with $X=A \cup B$ , the intersection $A \cap B$ is connected.

For example, any closed interval on the real line is unicoherent, but a circle is not.

If a unicoherent space is more strongly hereditarily unicoherent (meaning that every subcontinuum is unicoherent) and arcwise connected, then it is called a dendroid. If in addition it is locally connected then it is called a dendrite. The Phragmen–Brouwer theorem states that, for locally connected spaces, unicoherence is equivalent to a separation property of the closed sets of the space.

References

{{cite book |doi=10.1016/B978-044450355-8/50088-X |chapter=Unicoherence and Multicoherence |title=Encyclopedia of General Topology |year=2003 |last1=Charatonik |first1=Janusz J. |pages=331–333 |isbn=9780444503558|url={{Google books|JWyoCRkLFAkC|page=331|plainurl=yes}}}}

External links

{{MathWorld|urlname=UnicoherentSpace|title=Unicoherent Space|author=Insall, Matt}}

Category:General topology

Category:Trees (topology)