Well. This might just be the largest number on the wiki.
We can't say for sure.
What we can do... is attempt to measure this behemoth. That's what we need to do.
Telos function[]
So, we left off with the RLF. It's good but not good enough. This time it will be denoted as έx.
Note: Existence levels and layers are not the same. Levels encompass every layer that has the same level, which is infinite.
x is the universe level. Our universe in any existence level is 1, since it can observe but not interact with other universes. έ1 is Ω𑪞. Basically the way this works is έx is the limit number in the limit existence in the xth universe level. Also, this is immune to abstraction, and it is infinitely beyond any Hyper-Ineffability. Level 1 already encompasses fictoboxes and everything defined on the wiki thus far, as it used basic fiction rather than multi-existential fiction.
We can easily reach the limit of this function, έΩ𑪞. For now on the limit number of functions will be denoted as L.
έ loops, making έέn, then έέL. έέέn. έέέL. This goes on into the next iteration.
έ[x]y. For every x there is an έ. y = x in the last function. Of course x can be an έ, which gives us the next function.
έ{x}y. For every x there is an έ[x]y, which then the x inside of that contains an έ[x]y x times. Also y in this loop is x. y remains the same.
This can loop itself, creating έ{{x}}y, which is the same as the last except for every x there is an έ{x}y, which then the x inside of that contains an έ{x}y x times. Also y in this loop is x. y remains the same.
Then create έ[x[L]y]z. L is not a variable. x is the looping function. y is the level of expansion. z works like x in previous entries.
This function breaks ordinal levels, and Ordinal level < ordinal at this point.
Now for the number.[]
The limit of the last function. Its theoretical calculation, έ[ΩL[L]ΩL]ΩL, is very ineffable, the reason being there is no way to truly calculate this behemoth. Also, in that pseudo-calculation, Ω isn't absolute infinity, It's the limit in the previous function.