Interlocking interval topology

In mathematics, and especially general topology, the interlocking interval topology is an example of a topology on the set S := R⁺ \ Z⁺, i.e. the set of all positive real numbers that are not positive whole numbers.^[1]

The open sets in this topology are taken to be the whole set S, the empty set ∅, and the sets generated by

${\displaystyle X_n:=(0,\frac{1}{n})\cup (n,n+1)=\{x\in {𝐑}^{+}:0<x<\frac{1}{n}\text{ or }n<x<n+1\}.}$

The sets generated by X_n will be formed by all possible unions of finite intersections of the X_n.^[2]

• List of topologies

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