Aleph null

Aleph Null, represented as $$\aleph_0$$, is the smallest infinite cardinal number. It contains all natural numbers, and is followed by Aleph 1 - $$\aleph_1$$. Due to this, Aleph Null is a benchmark in size. It is also weakly inaccessible and most its ordinal counterpart is omega - $$\omega$$. Applying mathematical notations on $$\omega$$doesn't change its size, as it doesn't actually change the size of the set, but merely incorporates it with other sets in a different set. Meanwhile $$\aleph_0$$and $$\aleph_1$$have an actual cardinal size difference.

Some of the Omniverse's properties have a value of $$\aleph_0$$

Examples of using notations
$$\aleph_0+1=\aleph_0$$meanwhile $$\omega+1=\omega+1$$

$$2^{\aleph_0}=\aleph_1$$, if the continuum hypothesis is proven to be correct