Definition:Telophase Topology

Definition
Let $S = \closedint 0 1 \cup \set {1^*}$ where:
 * $\closedint 0 1$ is the closed unit interval $\set {x \in \R: 0 \le x \le 1}$
 * $1^*$ is a second right hand endpoint of $\closedint 0 1$.

Let $\BB$ be a local neighborhood basis defined as:
 * $\BB = \set {\openint a 1 \cup \set {1^*}: a \in \closedint 0 1}$

Let $\tau'$ be the topology generated from $\BB$.

$\tau$ is referred to as the telophase topology.

Also see

 * Telophase Topology is Topology