Colossus Extension[]
Colossus is an extension of Cylos Omega where a:cl:lc: co /c -b > a|\|\|a(b -n) but = u(x,a)(f v) in v,v,u+cO (fixed). This function is more powerful than the cylos function, as in the cylos function can be given any input number and it could never exceed even a finite CYCOL input.
Colossus (function) is written out as CYCOL(n)
Colossus (number) is equal to the limit of this where u(x) or u(a) are finite, being
Despite the small size, this number is far larger than any number made so far, even Hyperpositive layers.
Basic Extension 1[]
BE1 is extension of cylos first where
a >0>1>2... in b, x(b,a) (a,b) s;s c / bB-a(c) |/\ x
Equal size or slightly smaller than/to Exoo Classes
-Blety Terminator function[]
The Blety Terminator function is basically a function thats larger than all -Blety's even at the smallest level. it is defined by Xenoshey
basically, ∄(n) > ⨀{n;n&\\(1>2>3...)\\;[self]}
even just ∄(10-∄(n)) > Omegitilerimaliblety (ɷ)
∄(n) > Omegitilerimaliblety (ɷ) for any value of n, including 0 and other hyper-zero's
∄(1) = bletyterminus
first number where n>∄(n) = Gigusfinnius
however, ∄2(0) > ∄(n), because ∄2(n) = ⨀{n;n&\\(∄(1)>∄(2)>∄(3)...)\\;[self,◈]}
more coming soon
Another Simple Extension (BE2)[]
av:f/b/a...[a];c/C-b(a..[a]) d/d(a.[a])a,d(x) = e
e>1>2>2>3>3>3...> cd f
f = BE2()
This function is useless with finites.
Microextension (limit without being stupid)[]
Despite being far larger than BE2 omega+1, it is actually smaller than the next number on the list of numbers because this function is weak after .
Ace[]
Ace = (a,a[a,a]))] in b, z-a z... a|\||||\\\\\\|\\\||\\\|\\|||+q(a)a wh/ z > pz in z aA() + 1.
It can be written out as ♠.
Spade[]
Spade = aa(a,a,a,a,a,a(a[a,a,a...]))... (pn)