What is Cantor cube?

In mathematics, a Cantor cube is a topological group of the form {0, 1} for some index set A. Its algebraic and topological structures are the group direct product and product topology over the cyclic group of order 2.

If A is a countably infinite set, the corresponding Cantor cube is a Cantor space. Cantor cubes are special among compact groups because every compact group is a continuous image of one, although usually not a homomorphic image.

Topologically, any Cantor cube is:

By a theorem of Schepin, these four properties characterize Cantor cubes; any space satisfying the properties is homeomorphic to a Cantor cube.