Realityfinite End (Symbol: ^Ω𑪞), is the true end of numbers. It's the end of concepts, existence, hyperexistence, omniexistence, derivations, everything. It's the finale. There's no way to measure the true size of this properly.

Reality Limit Function.[]

NOTE: R-border is Realityfinite End, it's just easier to type.

R-border as i will call it, is defined with a function called Reality Limit Function (RLF). RLF is notated by λ/n. It has the ability to ignore collapsing points. Any n ≦ 0 = λ/0. λ/0 = Ω.

λ/n is defined as the final limit for said level of existence. For example, this universe's existence level is 1, and λ/1 ≅ V-lock.

λ/2 would roughly be Omniexistent Infinity, and this is Weak R-Border, or ^{10^^^^^^^^-10^300}𑪞. Still level 0.

Then this can loop infinitely. Level 1.

Then we can reach λ/λ/n. Level 2

Then make it have multiple parameters, λ^x(y). Level 3

This can expand into BAN, λ{x,y,z}. Level 4

Then we reach apeirological functions, λφ(n). Level 5

Then fictional googological, λxXn. Level 6

Notice the level. Expand this to λLx(y), which is the limit of the number in said level.

This loops. λL[x]y,z(a). x will be the number of times x loops in y and z, and they are the final numbers.

If these parameters are all the same simplify to λL{x}(y).

Then we expand it to expanding point limiters. λΨ(x,y...). There will be x parameters.

Now, for advanced numbers this would take forever to write out, so λΨ[x], this has the limitation of less control.

Now, the actual definition.[]

The godly end, it's here. Feel free to try to combat its size or expand the RLF.

REALITYFINITE END. THE ^Ω𑪞.

This number is defined as: λΨ[λΨ[λΨ[λΨ[λΨ[...λΨ[Ω]. This loops λΨ[Ω] times. Also, when we use Ω, we're not referring to absolute infinity, or λ/0, but rather the limit of the previous function, this being the λL{x}(y) function.