Definition:Inner Limit

Definition
Let $\left({\mathcal X, \tau}\right)$ be a Hausdorff topological space.

Let and $\left \langle {C_n}\right \rangle_{n \in \N}$ be a sequence of sets in $\mathcal X$.

The inner limit of $\left \langle {C_n}\right \rangle_{n \in \N}$ is defined as:
 * $\displaystyle \liminf_{n \to\infty} \ C_n := \left\{{x : \exists N \text{ cofinite set of }\N, \exists x_v \in C_v \left({v \in N}\right) \text{ such that } x_v \to x}\right\}$

The convergence $x_v \to x$ in the definition is meant with respect to the topology $\tau$, i.e. for every $V \in \tau$ with $x \in V$ there is a $N_0 \in \N$ such that for all $k\geq N_0$, $x_k \in V$.

Note
The definition of the inner limit of a sequence of sets extends that of the limit inferior of real numbers to a general topological space.

The inner limit should not be confused with the limit inferior of a sequence of sets, whose definition assumes no topological structure. Unfortunately, the same symbol $\liminf$ is usually used both for the inner limit as well as for the inferior limit, so the distinction needs to be made explicit.