Main theorem of connectedness
Let
Proof for plain connectedness
Without loss of generality, consider a surjection
. If is disconnected, it can be partitioned into open and , wherefore can be partitioned into open and and is thus disconnected. Alternatively, if is disconnected then there exists non-constant continuous , wherefore is nonconstant and continuous. Thus, if is compact so is its continuous image .
Proof for path-connectedness
Given any two points
there exists a continuous function such that and . Clearly, constitutes a continuous function , and therefore for any two points there exists a Continuous path such that and . Thus is path connected.
This is a remarkably rare instance of properties being inherited by images, usually properties are inherited by preïmages.
Corollaries
- Connectedness and Path connectedness are topological properties.
- The quotient of a connected space is connected.
- Connected fibres and quotient implies connected space