Category:Appert Space
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This category contains results about Appert Space.
Let $\Z_{>0}$ denote the (strictly) positive integers.
For a given subset $H$ of $\Z_{>0}$ and element $n$ of $\Z_{>0}$, let $\map N {n, H}$ denote the number of integers in $E$ which are less than or equal to $n$:
- $\forall n \in \Z_{>0}, H \subseteq \Z_{>0}: \map N {n, H} = \card {\set {x \in H: x \le n} }$
Let $\tau$ be the topology defined as:
- $1 \notin H \implies H \in \tau$
- $1 \in H$ and $\ds \lim_{n \mathop \to \infty} \dfrac {\map N {n, H} } n = 1 \implies H \in \tau$
for $H \subseteq \Z_{>0}$.
$\tau$ is referred to as the Appert topology.
The topological space $T = \struct {S, \tau}$ is referred to as the Appert space.
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