Containment

(Note: this page only uses verses as examples, but verses can be replaced with anything capable of containment.)

Verse $$A$$ is contained inside of verse $$B$$, if the set of all information of $$A$$ includes all information from the set of $$B$$. $$A\cap B=A$$

This rule takes advantage of the fact that laws map all information inside of the area of space they are inscribed in, which means that laws of $$B$$ influence all information from $$A$$, giving us an alternative definition to containment. This only works if $$B$$ has laws and is used for objects that aren’t obvious if they are contained by $$B$$. $$A$$ is partially contained in $$B$$ if $$A\cap B\nsubseteq\{\varnothing ,A\}$$.

Such a precise definition of containment is not needed in typical cases of $$A$$ and $$B$$, but is needed when one can not directly observe containment between $$A$$ and $$B$$ and must use limited information.

$$A$$ is not contained in $$B$$ if $$A\cap B=\varnothing$$.

When $$A$$’s area of influence reaches beyond $$B$$, $$A$$is mostly contained in $$B$$. However, if both $$A$$ and its area of influence is contained in $$B$$, $$A$$ is properly contained in $$B$$ (properly contained and contained have the same definition, properly contained is just more specific and used in more technical matters).

A verse that is lower dimensional than another verse can not contain said verse, as it is impossible, for example, a plane to contain a sphere.

Measurement
Typically, the position of a verse in containment, relative to the Universe, is measured in the EUSI scale. EUSI usually uses the Veblen Notation in order to describe transfinite levels of containment.