User:Maxywaxy/infinity

how to go past cantor's absolute infinity (or not, Ktkna 2019)
F(0) = 1

F(x) = infinity infinitely bigger than the previous number

F(1) = infinity (ω)

F(2) = transfinity (ω^2)

F(3) = kylinity (ω^3)

F(4) = myfinity (ω^4)

F(5) = lakinity (ω^5)

F(6) = meginity (ω^6)

F(7) = crorinity (ω^7)

F(8) = okinity (ω^8)

F(9) = giginity (ω^9)

F(10) = dilinity (ω^10)

F(11) = undinity (ω^11)

F(12) = terrinity (ω^12)

F(13) = tredinity (ω^13)

F(14) = quarinity (ω^14)

F(15) = petinity (ω^15)

F(16) = sqolinity (ω^16)

F(17) = setinity (ω^17)

F(18) = exinity (ω^18)

F(19) = edinity (ω^19)

F(20) = icinity (ω^20)

F(21) = zettinity (ω^21)

...

F(24) = yottinity (ω^24)

F(27) = xeninity (ω^27)

F(30) = wekinity (ω^30)

F(33) = vendinity (ω^33)

...

F(50) = goginity (ω^50)

F(100) = suprinity (ω^100)

F(1000) = chilinity (ω^10^3)

F(10000) = myrinity (ω^10^4)

F(33) = fuginity (ω^3^^3)

F(10100) = googinity (ω^10^100)

F(E100#2) = plexinity (ω^Ε100#2)

F(E100#100) = grandinity (ω^Ε100#100)

...

F(omega) = infininity (ω^ω)

F(omega+1) = uplo-omfinity (ω^(ω+1))

F(omega+2) = duplo-omfinity (ω^(ω+2))

F(omega+3) = triplo-omfinity (ω^(ω+3))

...

F(2w) = dumol-omfinity (ω^ω2)

F(3w) = trimol-omfinity (ω^ω3)

...

F(w2) = duexfinity = infinininity (ω^ω^2)

F(w3) = trixfinity = infininininity (ω^ω^3)

F(ww) = tetrinity = ultinity (ω^ω^ω)

F(epsilon_zero) = epinity (ε0)

...

F(zeta0) = zetrinity (ζ0)

F(gamma0) = gamminity (Γ0)

...

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F(infinity) = F(F(1)) = F(1,2) = cantor's absolute infinity (ω^ω)

F(transfinity) = F(F(2)) = F(2,2) = translutefinity (ω^ω^2)

F(3,2) = kylutefinity (ω^ω^3)

F(absolute infinity) = F(F(F(1))) = F(F(1,2)) = F(1,3) = ultrinity (ω^^4)

F(a,b) = F(F(F(...F(a)...))) with b layers

F(a,b,c) = F(a,F(a,F(a,...F(a,b)...))) with c layers

F(stuff,m,n) = F(stuff,F(stuff,F(stuff,F(...F(stuff,m)...)))) with n layers

F(1,1,1,...,1,1,1,2) with infinity ones = finalinity (Γ0)

F2(x) = F(1,1,1,...,1,1,1,2) with x ones

continue in pattern

F3(x) = F2(1,1,1,...,1,1,1,2) with x ones

Fx+1(n) = Fx(1,1,1,...,1,1,1,2) with n ones

Finfinity(infinity) = supremity (Γω)

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Maxywaxy's Absolute Infinity = ??? = size of Omegabox