Integer broom topology

In general topology, a branch of mathematics, the integer broom topology, is an example of a topology on the so-called integer broom space X.^[1]

Definition of the integer broom space

A subset of the integer broom

The integer broom space X is a subset of the plane R². Assume that the plane is parametrised by polar coordinates. The integer broom contains the origin and the points (n,θ) ∈ R² such that n is a non-negative integer, and θ ∈ {1/k : k ∈ N and k ≥ 1}.^[1] The image on the right gives an illustration for 0 ≤ n ≤ 5 and 1/15 ≤ θ ≤ 1. Geometrically, the space consists of a series of convergent sequences. For a fixed n, we have a sequence of points − lying on circle with centre (0,0) and radius n − that converges to the point (n,0).

Definition of the integer broom topology

We define a topology on X by means of a product topology. The Integer Broom space is given by the polar coordinates

Let us write (n,θ) ∈ U × V for simplicity. The Integer Broom topology on X is the product topology induced by giving U the right order topology, and V the subspace topology from R.^[1]

Properties

The integer broom space, together with the integer broom topology, is a compact topological space. It is a so-called Kolmogorov space, but it is neither a Fréchet space nor a Hausdorff space. The space is locally connected and path connected, while not arc connected.^[2]

See also

• Comb space
• Infinite broom

References