Extremally disconnected space
In mathematics, an extremally disconnected space is a topological space in which the closure of every open set is open.
An extremally disconnected space that is also compact and Hausdorff is sometimes called a Stonean space.
This is not the same as a Stone space, which is a totally disconnected compact Hausdorff space. Every Stonean space is a Stone space, but not vice versa. In the duality between Stone spaces and Boolean algebras, the Stonean spaces correspond to the complete Boolean algebras.
An extremally disconnected first-countable Hausdorff space">Hausdorff space">Hausdorff space must be discrete. In particular, for metric spaces, the property of being extremally disconnected is equivalent to the property of being discrete.
Examples and non-examples
- Every discrete space is extremally disconnected. Every indiscrete space is both extremally disconnected and connected.
- The Stone–Čech compactification of a discrete space is extremally disconnected.
- The spectrum of an abelian von Neumann algebra is extremally disconnected.
- Any commutative AW*-algebra is isomorphic to, for some space which is extremally disconnected, compact and Hausdorff.
- Any infinite space with the cofinite topology is both extremally disconnected and connected. More generally, every hyperconnected space is extremally disconnected.
- The space on three points with base provides a finite example of a space that is both extremally disconnected and connected. Another example is given by the Sierpinski space, since it is finite, connected, and hyperconnected.
- The Cantor set is not extremally disconnected. However, it is totally disconnected.
Equivalent characterizations
A theorem due to says that the projective objects of the category of compact Hausdorff spaces are exactly the extremally disconnected compact Hausdorff spaces. A simplified proof of this fact is given by.A compact Hausdorff space is extremally disconnected if and only if it is a retract of the Stone–Čech compactification of a discrete space.