Topological indistinguishability

Definition

Topological indistinguishability is an equivalence relation on any topological space. For a topological space ${\displaystyle X}$, two (possibly equal, possibly distinct) points ${\displaystyle x,y\in X}$ are termed topologically indinstinguishable if the following equivalent conditions hold:

1. The closures of the singleton sets ${\displaystyle \{x\}}$ and ${\displaystyle \{y\}}$ are equal.
2. Every closed subset containing ${\displaystyle x}$ contains ${\displaystyle y}$ and every closed subset containing ${\displaystyle y}$ contains ${\displaystyle x}$.
3. Every open subset containing ${\displaystyle x}$ contains ${\displaystyle y}$ and every open subset containing ${\displaystyle y}$ contains ${\displaystyle x}$.

Two distinct points that are not topologically indistinguishable are termed topologically distinguishable.

Related notions

• The Kolmogorov quotient of a topological space is the quotient by the equivalence relation of topological indistinguishability, and it is given the T0 topology.