Definition:Stopping Time/Discrete Time/Definition 2

Definition
Let $\struct {\Omega, \Sigma, \sequence {\FF_n}_{n \ge 0}, \Pr}$ be a filtered probability space.

Let $T : \Omega \to \Z_{\ge 0} \cup \set {\infty}$ be a random variable.

We say that $T$ is a stopping time with respect to $\sequence {\FF_n}_{n \ge 0}$ :
 * $\set {\omega \in \Omega : \map T \omega = t} \in \FF_t$

for all $t \in \Z_{\ge 0}$.