End (topology)

In general topology, an end of a topological space generalises the notion of "point at infinity" of the real line or plane.

An end of a topological space X is a function e which assigns to each compact set K in X some connected component with non-compact closure e(K) of the complement X - K in a compatible way, so that


 * $$K_1 \subseteq K_2 \Rightarrow e(K_1) \supseteq e(K_2) .\,$$

If X is compact, then there are no ends.

Examples

 * The real line has two ends, which may be denoted ±∞. If K is a compact subset of R then by the Heine-Borel theorem K is closed and bounded.  There are two unbounded components of K: if K is contained in the interval [a,b], they are the components containing (-∞,a) and (b,+∞).  An end is a consistent choice of the left- or the right-hand component.
 * The real plane has one end, ∞. If K is a compact, hence closed and bounded, subset of the plane, contained in the disc of radius r, say, then there is a single unbounded component to X-K, containing the complement of the disc.

Compactification
Denote the set of ends of X by E(X) and let $$X^* = X \cup E(X)$$. We may topologise $$X^*$$ by taking as neighbourhoods of e the sets $$N_K(e) = e(K) \cup \{f \in E(X) : f(K)=e(K) \}$$ for compact K in X.