Talk:Gorgegahlah

Here I'll clarify my edits on the SGH: it has been proven that \(g_{\vartheta(\varepsilon_{\Omega+1})}(n) \approx X \uparrow\uparrow X \&\ n\). Therefore, I can find correspondences between some fundamental sequences:

\(g_{\vartheta(\Omega^{\Omega^\omega})(n) \approx X^X \&\ n\)

\(g_{\vartheta(\Omega^{\Omega})(n) \approx X^2 \&\ n\)

\(g_{\vartheta(\Omega^{\vartheta(\Omega^\omega)})(n) \approx X*2 \&\ n\)

\(g_{\vartheta(\Omega^{\vartheta(\Omega^2)}(n) \approx \{n,n (1) n,n\}\)

\(g_{\vartheta(\Omega^{\vartheta(\Omega)}(n) \approx \{n,n (1) n\}\)

\(g_{\vartheta(\Omega^{\vartheta(\vartheta(1))}(n) \approx \{n,n (1) 4\}\)

\(g_{\vartheta(\Omega^{\vartheta(1)}(n) \approx \{n,n (1) 3\}\)

\(g_{\vartheta(\Omega^{\omega^\omega})(n) \approx \{n,n,n (1) 2\}\)

\(g_{\vartheta(\Omega^{\omega^2})(n) \approx \{n,n,2 (1) 2\}\)

\(g_{\vartheta(\Omega^{\omega})(n) \approx \{n,n (1) 2\}\) Ikosarakt1 (talk ^ contribs) 20:28, April 5, 2013 (UTC)