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chronolegends
chronolegends
23:01
the fun stuff beings up to and above $\psi(\Omega^{\Omega^\Omega})$ , below we can use $\varphi(...)$
Secret
Secret
oops mistake
chronolegends
chronolegends
np :)
Hans
Hans
23:17
@SimplyBeautifulArt: Did you call out for me?
Simply Beautiful Art
Simply Beautiful Art
@Hans heyo
Hans
Hans
Howdy
Simply Beautiful Art
Simply Beautiful Art
@chronolegends $$\psi(\Omega^{\Omega^\Omega}) =\varphi(1, \underbrace{0,\dots,0}_{\varphi(1, \underbrace{0,\dots,0}_{\varphi(1, \underbrace{0,\dots,0}_{\varphi(1, \underbrace{0,\dots,0}_{\vdots})})})})$$
chronolegends
chronolegends
hahahahaha, nice
Secret
Secret
23:32
\begin{align}
\psi (\Omega)[n,\Omega] & = \psi^{n+1}(\omega) = \epsilon_{\ddots\epsilon_{\omega}}\\
\psi (\Omega +1)[n,\Omega +1] = \psi(\Omega +1[n,\Omega+1]) & = \psi(\Omega) = \zeta_0\\
\psi (\Omega +(m+1))[n,\Omega +(m+1)] = \psi(\Omega +(m+1)[n,\Omega+1]) & = \psi(\Omega+m) = \epsilon_{\zeta_0+m}\\
\psi (\Omega + \Omega)[n,\Omega + \Omega] = \psi(\Omega +\Omega[n,\Omega+\Omega]) & = [\psi(\Omega +]^{n+1}(\omega) = \zeta_1\\
\psi (\Omega2 + \Omega)[n,\Omega2 + \Omega] = \psi(\Omega2 +\Omega[n,\Omega2+\Omega]) & = [\psi(\Omega 2 +]^{n+1}(\omega) = \zeta_2\\
Simply Beautiful Art
Simply Beautiful Art
Oh dear.
@Secret I'd prefer to write "$\to$" instead of the last equality. You should be considering $n\to\omega$ there.
I assume you are asking "What's $\psi(\Omega^22)$ equal to?"
Before you just so far, consider the following pattern:
$\psi(x)=\varepsilon_x$
$\psi(\Omega(1+a)+b)=\varepsilon_{\zeta_a+b}$
$\psi(\Omega^2(1+a)+\Omega(1+b)+c)=\varepsilon_{ \zeta_{?+b}+c}$
chronolegends
chronolegends
try to avoid using minus signs when handling ordinals
Simply Beautiful Art
Simply Beautiful Art
@chronolegends Huh? The only minus signs I see are in relation to $n$, which should be a natural number.
Logically, the $?$ is a function of $a$, and it's probably the natural continuation of the sequence $\varepsilon,\zeta,?,\dots$
chronolegends
chronolegends
I know, there isn't a problem with the way he did but, its just like a general use advice
Secret
Secret
@SimplyBeautifulArt Is $\Omega^m$ where $m < \omega$ the m-th fixed point map in the Veblen hierarchy (i.e. $\eta_a$ for $m=2$)?
Simply Beautiful Art
Simply Beautiful Art
23:39
@chronolegends >.> I feel like you say that every time you say something you want to take back.
chronolegends
chronolegends
I don't take it back
lol
Simply Beautiful Art
Simply Beautiful Art
@Secret Actually, you can just let $m<\Gamma_0$.
And yes, that is how it goes.
Secret
Secret
ok
Simply Beautiful Art
Simply Beautiful Art
Pretty nifty huh?
Secret
Secret
Into the Veblen hierarchy:
Simply Beautiful Art
Simply Beautiful Art
23:40
But wait
chronolegends
chronolegends
He's diving into it
exciting
Simply Beautiful Art
Simply Beautiful Art
You still didn't answer my questions!!!
56 mins ago, by Simply Beautiful Art
(in terms of more natural numbers, $\omega$, $\Omega$ and $\psi$'s, but not reducing to anything else)
What did $\psi(\Omega)$ expand into?
What did $\psi(\Omega+\Omega)$ expand into?
What do you think $\psi(\Omega2+\Omega)$ will expand into?
Oh, well you did...
Secret
Secret
That's where I align all the equal signs
Simply Beautiful Art
Simply Beautiful Art
I meant to ask a different underlying question about all this before you moved on!
That is.
What effect do you think $\Omega$ has?
Secret
Secret
$\Omega$ tracks the type of fixed point mapping involved?
e.g. Given some fixed point map $X_y$, $\Omega^X y$ controls the map involved using $X$ and $y$
Simply Beautiful Art
Simply Beautiful Art
23:44
Yup
And so...
It should almost feel natural how this ties into the Veblen function.
chronolegends
chronolegends
give him $\Gamma_0$ now
Simply Beautiful Art
Simply Beautiful Art
:o
chronolegends
chronolegends
he's ready
Simply Beautiful Art
Simply Beautiful Art
lol, okay
@Secret Expand $\psi(\Omega^\Omega)$
@chronolegends See, if you had put those two lines in one I would've starred it.
chronolegends
chronolegends
hahaha
Simply Beautiful Art
Simply Beautiful Art
23:46
:P
Knowledge from the future and your intuition:
$$\psi(\Omega^x)=\varphi_{1+x}(0), 0<x<\Omega$$
For most large enough $x$, this reduces down to
$$\psi(\Omega^x)=\varphi_x(0)$$
@chronolegends hope I'm not spoon-feeding him the answers.
chronolegends
chronolegends
No, thats good pacing
i'll throw in, $\Gamma_0 = \varphi_{..._{\varphi(0)}}$
Simply Beautiful Art
Simply Beautiful Art
@chronolegends Horrible syntax.
chronolegends
chronolegends
lol fixed
Simply Beautiful Art
Simply Beautiful Art
Horrendous syntax.
Nah mate.
chronolegends
chronolegends
lol
Simply Beautiful Art
Simply Beautiful Art
23:52
Those look like single argument Veblen functions
Like what is that
chronolegends
chronolegends
they are
$\varphi_{..._{\varphi(0)}(0)}(0)$ better?
Simply Beautiful Art
Simply Beautiful Art
@chronolegends BLEH
Use \ddots for diagonalized dots.
chronolegends
chronolegends
nice
k
Simply Beautiful Art
Simply Beautiful Art
Also
the number of φ's does not match the number of $(0)$'s
07:00 - 20:0020:00 - 23:0023:00 - 00:00

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