THANK YOU, LEO! I KNEW I WASN'T TOTALLY WRONG.
You can make a super function at \(\eta^-\), through the bifurcation between both the upper and lower fixed points. It won't be tetrational, which is the final point you pull out. It won't be real valued and equal \(1\). It'll equal \(0\) somewhere in the complex plane when it's real valued. But it won't be "tetrational" as Bo, and Kouznetsov, described; when we consider it on the real line.
You can make a super function at \(\eta^-\), through the bifurcation between both the upper and lower fixed points. It won't be tetrational, which is the final point you pull out. It won't be real valued and equal \(1\). It'll equal \(0\) somewhere in the complex plane when it's real valued. But it won't be "tetrational" as Bo, and Kouznetsov, described; when we consider it on the real line.