Absility[1] (Λ) is the smallest infinite cardinal (gendial) which is totally inaccessible from building reflecting principles and n-sort reducible universes, equal to ⏦x⏦ where ⏦ is Inaccessiblefinity.
This is derived from "The true magnitude of Absolute Totality"[citation needed] mathematical paper.
It is still based on Onefinity somehow, with an approximate value of: (①)^(6^2)= (①)^32.
Aarex calls this cardinal Absolute Totality. Pink Ron calls this Number One pound. NO! calls this number Absolute Everything[2], but anyways now he call it Absility too.
MSLF4600 calls this cardinal The Infinity Absolute.
Relations[]
- Absility is a variant of Absolute Infinity, in which includes all reflecting principles built from/on a-sort universes, and a-sort universes, from the definition.
- This is the highest number definable from "The true magnitude of Absolute Totality" mathematical paper, surpassing Absolute Eternal.
- If you multiply Absility by itself, you make Terminusfinity.