connected im kleinen

A topological space $X$ is connected im kleinen at a point $x$ if every open set $U$ containing $x$ contains an open set $V$ containing $x$ such that if $y$ is a point of $V$ , then there is a connected subset of $U$ containing $\{x,y\}$ .
Another way to say this is that $X$ is connected im kleinen at a point $x$ if $x$ has a neighborhood base of connected sets (not necessarily open).

A locally connected space is connected im kleinen at each point.

A space can be connected im kleinen at a point but not locally connected at the point.

If a topological space is connected im kleinen at each point, then it is locally connected.

References

1 S. Willard, General Topology, Addison-Wesley, Publishing Company, 1970.
2 J.G. Hocking, G.S. Young, Topology, Dover Pubs, 1988, republication of 1961 Addison-Wesley edition.

Title	connected im kleinen
Canonical name	ConnectedImKleinen
Date of creation	2013-03-22 15:59:00
Last modified on	2013-03-22 15:59:00
Owner	Mathprof (13753)
Last modified by	Mathprof (13753)
Numerical id	8
Author	Mathprof (13753)
Entry type	Definition
Classification	msc 54D05