๐ Long line (topology)
๐ Mathematics
In topology, the long line (or Alexandroff line) is a topological space somewhat similar to the real line, but in a certain way "longer". It behaves locally just like the real line, but has different large-scale properties (e.g., it is neither Lindelรถf nor separable). Therefore, it serves as one of the basic counterexamples of topology. Intuitively, the usual real-number line consists of a countable number of line segments [0,ย 1) laid end-to-end, whereas the long line is constructed from an uncountable number of such segments.
Discussed on
- "Long line (topology)" | 2015-05-02 | 46 Upvotes 21 Comments