Definition: Isolated Point
Let be a topological space and let be a subset of .
A point is an isolated point of iff has a neighbourhood which does not contain any other points of .
Definition: Isolated Point
Let (X,τ) be a topological space and let S be a subset of X.
A point p∈S is an isolated point of S iff p has a neighbourhood N(p) which does not contain any other points of S.
N(p)∩S={p}
