fffz分析Part7 - 版本历史

http://wiki.googology.top/index.php?action=history&feed=atom&title=fffz%E5%88%86%E6%9E%90Part7 fffz分析Part7 - 版本历史 2026-04-22T15:44:05Z 本wiki上该页面的版本历史 MediaWiki 1.43.1 http://wiki.googology.top/index.php?title=fffz%E5%88%86%E6%9E%90Part7&diff=2541&oldid=prev Tabelog：文字替换 -“BMS”替换为“BMS” 2025-08-30T13:35:02Z

<p>文字替换 -“<a href="/index.php?title=Bashicu%E7%9F%A9%E9%98%B5&action=edit&redlink=1" class="new" title="Bashicu矩阵（页面不存在）">BMS</a>”替换为“<a href="/index.php/BMS" title="BMS">BMS</a>”</p> <table style="background-color: #fff; color: #202122;" data-mw="interface"> <col class="diff-marker" /> <col class="diff-content" /> <col class="diff-marker" /> <col class="diff-content" /> <tr class="diff-title" lang="zh-Hans-CN"> <td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">←上一版本</td> <td colspan="2" style="background-color: #fff; color: #202122; text-align: center;">2025年8月30日 (六) 21:35的版本</td> </tr><tr><td colspan="2" class="diff-lineno" id="mw-diff-left-l1">第1行：</td> <td colspan="2" class="diff-lineno">第1行：</td></tr> <tr><td class="diff-marker" data-marker="−"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #ffe49c; vertical-align: top; white-space: pre-wrap;"><div>本词条展示[[Fake Fake Fake Zeta|fffz]]分析的第七部分。使用<math>MOCF</math>和[[<del style="font-weight: bold; text-decoration: none;">Bashicu矩阵|</del>BMS]]对照</div></td><td class="diff-marker" data-marker="+"></td><td style="color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #a3d3ff; vertical-align: top; white-space: pre-wrap;"><div>本词条展示[[Fake Fake Fake Zeta|fffz]]分析的第七部分。使用<math>MOCF</math>和[[BMS]]对照</div></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><br></td></tr> <tr><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div><nowiki>\begin{align}s\\&\psi_Z[\varepsilon_0^{\varepsilon_0^\omega}](\varepsilon_0^{\varepsilon_0^\omega})=\psi((2-)^\omega)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega})=\psi((2-)^{((2))})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}+\varepsilon_0)=\psi((2-)^{(1-2)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}+\varepsilon_0^2)=\psi((2-)^{(1-1-2)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)(2,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}+\varepsilon_0^{\varepsilon_0})=\psi((2-)^{(1-(2~1-2))})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}+\varepsilon_0^{\varepsilon_0^2})=\psi((2-)^{(1-2-2)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}+\varepsilon_0^{\varepsilon_0^3})=\psi((2-)^{(1-2-2-2)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)(3,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^\omega}\times2](\varepsilon_0^{\varepsilon_0^\omega}\times2)=\psi((2-)^{(2-)^\omega})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)(4,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}\times2)=\psi((2-)^{(2-)^{((2))}})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}\times3)=\psi((2-)^{(2-)^{(2-)^{((2))}}})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^\omega}\times\omega](\varepsilon_0^{\varepsilon_0^\omega}\times\omega)=\psi((2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}\times\omega)=\psi((1-)^{((2))}~~(1-)^{((2-)^{(1,0)})}~~\rm aft~~(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega+1})=\psi(1-(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega+2})=\psi(1-(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(2,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^\omega+\omega}](\varepsilon_0^{\varepsilon_0^\omega+\omega})=\psi((1-)^\omega~(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(3,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega+\omega})=\psi((1-)^{((2))}~(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(3,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega+\varepsilon_0})=\psi(1-2~~1-(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega+\varepsilon_0^2})=\psi(1-2-2~~1-(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(3,1,1)(3,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^\omega\times2}](\varepsilon_0^{\varepsilon_0^\omega\times2})=\psi((2-)^\omega~~1-(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(3,1,1)(4,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega\times2})=\psi((2-)^{((2))}~~1-(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(3,1,1)(4,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega\times3})=\psi((2-)^\omega~~1-(2-)^{(1,0)}~~1-(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(3,1,1)(4,1,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^\omega\times\omega}](\varepsilon_0^{\varepsilon_0^\omega\times\omega})=\psi(((2-)^{(1,0)}~~1-)^\omega)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega\times\omega})=\psi(((2-)^{(1,0)}~~1-)^{((2))})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\omega+1}})=\psi(1-(2-)^{(1,1)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\omega+2}})=\psi(1-(2-)^{(1,2)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\omega+3}})=\psi(1-(2-)^{(1,3)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(3,1,1)(3,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\omega\times2}}](\varepsilon_0^{\varepsilon_0^{\omega\times2}})=\psi((2-)^{(1,\omega)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(4,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\omega\times2}})=\psi((2-)^{(1,\Omega)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(4,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\omega\times2}}+\varepsilon_0)=\psi((2-)^{(1,\Omega_\omega)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(4,1,0)(1,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\omega\times2}}+\varepsilon_0^{\varepsilon_0})=\psi((2-)^{(1,I_\omega)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\omega\times2}}\times2)=\psi((2-)^{(1,(2-)^{\Omega})})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\omega\times2}}\times\omega](\varepsilon_0^{\varepsilon_0^{\omega\times2}}\times\omega)=\psi((2-)^{(1,(2-)^{(1,0)}})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(4,1,0)(2,0,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\omega^2}}\times\omega](\varepsilon_0^{\varepsilon_0^{\omega^2}}\times\omega)=\psi((2-)^{(1,0,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(4,1,0)(4,1,0)(2,0,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\omega^\omega}}\times\omega](\varepsilon_0^{\varepsilon_0^{\omega^\omega}}\times\omega)=\psi((2-)^{(1@\Omega)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(4,1,0)(5,1,0)(2,0,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}](\varepsilon_0^{\varepsilon_0^{\varepsilon_0}})=\psi(\psi_{\Omega_{K+1}}(0))=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(5,2,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}})=\psi(K_\omega)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega})=\psi(K_\Omega)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega}+\varepsilon_0^{\varepsilon_0^3+\omega})=\psi(K_{N_\Omega})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega}+\varepsilon_0^{\varepsilon_0^3+\omega}+\varepsilon_0^{\varepsilon_0^2+\omega})=\psi(K_{N_{M_\Omega}})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)(3,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega}+\varepsilon_0^{\varepsilon_0^3+\omega}+\varepsilon_0^{\varepsilon_0^2+\omega}+\varepsilon_0^{\varepsilon_0+\omega})=\psi(K_{N_{M_{I_\Omega}}})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)(3,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega}+\varepsilon_0^{\varepsilon_0^3+\omega}+\varepsilon_0^{\varepsilon_0^2+\omega}+\varepsilon_0^{\varepsilon_0+\omega}+\varepsilon_0)=\psi(K_{N_{M_{I_{\Omega_\omega}}}})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)(3,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(2,1,1)(3,1,0)(1,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+1},\psi_Z[\varepsilon_0^{\varepsilon_0^3}](\varepsilon_0^{\varepsilon_0^3})\times\omega](\psi_Z[\varepsilon_0^{\varepsilon_0^3}](\varepsilon_0^{\varepsilon_0^3})\times\omega)^?=\psi(K_{N_{K+1}})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(5,2,1)(6,2,1)(7,2,1)(8,2,1)(7,2,0)(5,2,1)(6,2,1)(7,2,1)(7,2,1)(7,2,0)(8,3,1)(9,3,1)(10,3,1)(11,3,1)(9,3,1)(10,3,1)(8,3,1)(9,3,1)(10,3,1)(10,3,1)(10,2,0)(6,0,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega}\times\omega](\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega}\times\omega)=\psi((1-)^{(1,0)}~~3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,0)(2,0,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega\times2}\times\omega](\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega\times2}\times\omega)=\psi(2~~1-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,0)(2,1,1)(3,1,0)(2,0,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\varepsilon_0^2}](\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\varepsilon_0^2})=\psi(1-2-2~~1-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,1)(3,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\varepsilon_0^\omega}](\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\varepsilon_0^\omega})=\psi((2-)^\omega~~1-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,1)(4,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\varepsilon_0^\omega})=\psi((2-)^{((2))}~~1-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,1)(4,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}\times2})=\psi(1-3~~1-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,1)(4,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}\times3})=\psi(1-3~~1-3~~1-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,1)(4,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0+1}})=\psi(1-2-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0+2}})=\psi(1-2-2-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(3,1,1)(3,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0+\omega}}](\varepsilon_0^{\varepsilon_0^{\varepsilon_0+\omega}})=\psi((2-)^\omega~~3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(3,1,1)(4,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0+\omega}})=\psi((2-)^{((2))}~~3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(3,1,1)(4,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0\times2}})=\psi(1-3~~2-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(3,1,1)(4,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0\times3}})=\psi(1-3~~2-3~~2-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(3,1,1)(4,1,1)(3,1,1)(4,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0\times\omega}}](\varepsilon_0^{\varepsilon_0^{\varepsilon_0\times\omega}})=\psi((3~~2-)^\omega)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(4,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0\times\omega}})=\psi((3~~2-)^{((2))})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(4,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^2}})=\psi(3-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(4,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^3}})=\psi(3-3-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(4,1,1)(4,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0^\omega}}](\varepsilon_0^{\varepsilon_0^{\varepsilon_0^\omega}})=\psi((3-)^\omega)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^\omega}})=\psi((3-)^{((2))})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}}](\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}})=\psi((1-)^{(1,0)}~~\rm aft~~3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,0)(6,2,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}})=\psi(\kappa_\omega)=\psi(1-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}+1})=\psi(1-1-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(2,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}+\varepsilon_0})=\psi(1-2~~1-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(2,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}+\varepsilon_0^2})=\psi(1-2-2~~1-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(2,1,1)(3,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}+\varepsilon_0^{\varepsilon_0}})=\psi(1-3~~1-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(2,1,1)(3,1,1)(4,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}\times2})=\psi(1-4~~1-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+1}})=\psi(1-2-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+2}})=\psi(1-2-2-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(3,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\varepsilon_0}})=\psi(1-3~~2-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(3,1,1)(4,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}\times2}})=\psi(1-4~~2-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(3,1,1)(4,1,1)(5,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0+1}}})=\psi(1-3-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(4,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0\times2}}})=\psi(1-4~~3-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(4,1,1)(5,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0^2}}})=\psi(1-4-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(5,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0^\omega}}}](\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0^\omega}}})=\psi((4-)^\omega)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(6,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0^\omega}}})=\psi((4-)^{((2))})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(6,1,0)\\&\psi_Z(\varepsilon_0\uparrow\uparrow5)=\psi(1-5)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(6,1,1)\\&\psi_Z(\varepsilon_0\uparrow\uparrow6)=\psi(1-6)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(6,1,1)(7,1,1)\\&\psi_Z(\varepsilon_0\uparrow\uparrow7)=\psi(1-7)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(6,1,1)(7,1,1)(8,1,1)\\&\LARGE\color{red}{\psi_Z[\varepsilon_1](\varepsilon_1)=(0,0,0)(1,1,1)(2,2,0)=\psi(\lambda\alpha.(\alpha+1)-\Pi_0)=\rm SSO}\end{align}</nowiki></div></td><td class="diff-marker"></td><td style="background-color: #f8f9fa; color: #202122; font-size: 88%; border-style: solid; border-width: 1px 1px 1px 4px; border-radius: 0.33em; border-color: #eaecf0; vertical-align: top; white-space: pre-wrap;"><div><nowiki>\begin{align}s\\&\psi_Z[\varepsilon_0^{\varepsilon_0^\omega}](\varepsilon_0^{\varepsilon_0^\omega})=\psi((2-)^\omega)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega})=\psi((2-)^{((2))})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}+\varepsilon_0)=\psi((2-)^{(1-2)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}+\varepsilon_0^2)=\psi((2-)^{(1-1-2)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)(2,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}+\varepsilon_0^{\varepsilon_0})=\psi((2-)^{(1-(2~1-2))})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}+\varepsilon_0^{\varepsilon_0^2})=\psi((2-)^{(1-2-2)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}+\varepsilon_0^{\varepsilon_0^3})=\psi((2-)^{(1-2-2-2)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)(3,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^\omega}\times2](\varepsilon_0^{\varepsilon_0^\omega}\times2)=\psi((2-)^{(2-)^\omega})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)(4,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}\times2)=\psi((2-)^{(2-)^{((2))}})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}\times3)=\psi((2-)^{(2-)^{(2-)^{((2))}}})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^\omega}\times\omega](\varepsilon_0^{\varepsilon_0^\omega}\times\omega)=\psi((2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}\times\omega)=\psi((1-)^{((2))}~~(1-)^{((2-)^{(1,0)})}~~\rm aft~~(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega+1})=\psi(1-(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega+2})=\psi(1-(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(2,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^\omega+\omega}](\varepsilon_0^{\varepsilon_0^\omega+\omega})=\psi((1-)^\omega~(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(3,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega+\omega})=\psi((1-)^{((2))}~(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(3,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega+\varepsilon_0})=\psi(1-2~~1-(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega+\varepsilon_0^2})=\psi(1-2-2~~1-(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(3,1,1)(3,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^\omega\times2}](\varepsilon_0^{\varepsilon_0^\omega\times2})=\psi((2-)^\omega~~1-(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(3,1,1)(4,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega\times2})=\psi((2-)^{((2))}~~1-(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(3,1,1)(4,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega\times3})=\psi((2-)^\omega~~1-(2-)^{(1,0)}~~1-(2-)^{(1,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(3,1,1)(4,1,0)(2,1,1)(3,1,1)(4,1,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^\omega\times\omega}](\varepsilon_0^{\varepsilon_0^\omega\times\omega})=\psi(((2-)^{(1,0)}~~1-)^\omega)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega\times\omega})=\psi(((2-)^{(1,0)}~~1-)^{((2))})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\omega+1}})=\psi(1-(2-)^{(1,1)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\omega+2}})=\psi(1-(2-)^{(1,2)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\omega+3}})=\psi(1-(2-)^{(1,3)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(3,1,1)(3,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\omega\times2}}](\varepsilon_0^{\varepsilon_0^{\omega\times2}})=\psi((2-)^{(1,\omega)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(4,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\omega\times2}})=\psi((2-)^{(1,\Omega)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(4,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\omega\times2}}+\varepsilon_0)=\psi((2-)^{(1,\Omega_\omega)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(4,1,0)(1,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\omega\times2}}+\varepsilon_0^{\varepsilon_0})=\psi((2-)^{(1,I_\omega)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\omega\times2}}\times2)=\psi((2-)^{(1,(2-)^{\Omega})})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(4,1,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\omega\times2}}\times\omega](\varepsilon_0^{\varepsilon_0^{\omega\times2}}\times\omega)=\psi((2-)^{(1,(2-)^{(1,0)}})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(4,1,0)(2,0,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\omega^2}}\times\omega](\varepsilon_0^{\varepsilon_0^{\omega^2}}\times\omega)=\psi((2-)^{(1,0,0)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(4,1,0)(4,1,0)(2,0,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\omega^\omega}}\times\omega](\varepsilon_0^{\varepsilon_0^{\omega^\omega}}\times\omega)=\psi((2-)^{(1@\Omega)})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(3,1,1)(4,1,0)(5,1,0)(2,0,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}](\varepsilon_0^{\varepsilon_0^{\varepsilon_0}})=\psi(\psi_{\Omega_{K+1}}(0))=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(5,2,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}})=\psi(K_\omega)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega})=\psi(K_\Omega)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega}+\varepsilon_0^{\varepsilon_0^3+\omega})=\psi(K_{N_\Omega})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega}+\varepsilon_0^{\varepsilon_0^3+\omega}+\varepsilon_0^{\varepsilon_0^2+\omega})=\psi(K_{N_{M_\Omega}})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)(3,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega}+\varepsilon_0^{\varepsilon_0^3+\omega}+\varepsilon_0^{\varepsilon_0^2+\omega}+\varepsilon_0^{\varepsilon_0+\omega})=\psi(K_{N_{M_{I_\Omega}}})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)(3,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega}+\varepsilon_0^{\varepsilon_0^3+\omega}+\varepsilon_0^{\varepsilon_0^2+\omega}+\varepsilon_0^{\varepsilon_0+\omega}+\varepsilon_0)=\psi(K_{N_{M_{I_{\Omega_\omega}}}})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)(3,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(3,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(2,1,1)(3,1,0)(1,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+1},\psi_Z[\varepsilon_0^{\varepsilon_0^3}](\varepsilon_0^{\varepsilon_0^3})\times\omega](\psi_Z[\varepsilon_0^{\varepsilon_0^3}](\varepsilon_0^{\varepsilon_0^3})\times\omega)^?=\psi(K_{N_{K+1}})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)(5,2,1)(6,2,1)(7,2,1)(8,2,1)(7,2,0)(5,2,1)(6,2,1)(7,2,1)(7,2,1)(7,2,0)(8,3,1)(9,3,1)(10,3,1)(11,3,1)(9,3,1)(10,3,1)(8,3,1)(9,3,1)(10,3,1)(10,3,1)(10,2,0)(6,0,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega}\times\omega](\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega}\times\omega)=\psi((1-)^{(1,0)}~~3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,0)(2,0,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega\times2}\times\omega](\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\omega\times2}\times\omega)=\psi(2~~1-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,0)(2,1,1)(3,1,0)(2,0,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\varepsilon_0^2}](\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\varepsilon_0^2})=\psi(1-2-2~~1-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,1)(3,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\varepsilon_0^\omega}](\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\varepsilon_0^\omega})=\psi((2-)^\omega~~1-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,1)(4,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\varepsilon_0^\omega})=\psi((2-)^{((2))}~~1-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,1)(4,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}\times2})=\psi(1-3~~1-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,1)(4,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0}\times3})=\psi(1-3~~1-3~~1-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,1)(4,1,1)(2,1,1)(3,1,1)(4,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0+1}})=\psi(1-2-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0+2}})=\psi(1-2-2-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(3,1,1)(3,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0+\omega}}](\varepsilon_0^{\varepsilon_0^{\varepsilon_0+\omega}})=\psi((2-)^\omega~~3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(3,1,1)(4,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0+\omega}})=\psi((2-)^{((2))}~~3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(3,1,1)(4,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0\times2}})=\psi(1-3~~2-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(3,1,1)(4,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0\times3}})=\psi(1-3~~2-3~~2-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(3,1,1)(4,1,1)(3,1,1)(4,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0\times\omega}}](\varepsilon_0^{\varepsilon_0^{\varepsilon_0\times\omega}})=\psi((3~~2-)^\omega)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(4,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0\times\omega}})=\psi((3~~2-)^{((2))})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(4,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^2}})=\psi(3-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(4,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^3}})=\psi(3-3-3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(4,1,1)(4,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0^\omega}}](\varepsilon_0^{\varepsilon_0^{\varepsilon_0^\omega}})=\psi((3-)^\omega)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^\omega}})=\psi((3-)^{((2))})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,0)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}}](\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}})=\psi((1-)^{(1,0)}~~\rm aft~~3)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,0)(6,2,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}})=\psi(\kappa_\omega)=\psi(1-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}+1})=\psi(1-1-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(2,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}+\varepsilon_0})=\psi(1-2~~1-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(2,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}+\varepsilon_0^2})=\psi(1-2-2~~1-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(2,1,1)(3,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}+\varepsilon_0^{\varepsilon_0}})=\psi(1-3~~1-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(2,1,1)(3,1,1)(4,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}}\times2})=\psi(1-4~~1-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+1}})=\psi(1-2-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+2}})=\psi(1-2-2-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(3,1,1)(3,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}+\varepsilon_0}})=\psi(1-3~~2-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(3,1,1)(4,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0}\times2}})=\psi(1-4~~2-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(3,1,1)(4,1,1)(5,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0+1}}})=\psi(1-3-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(4,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0\times2}}})=\psi(1-4~~3-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(4,1,1)(5,1,1)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0^2}}})=\psi(1-4-4)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(5,1,1)\\&\psi_Z[\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0^\omega}}}](\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0^\omega}}})=\psi((4-)^\omega)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(6,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^{\varepsilon_0^{\varepsilon_0^\omega}}})=\psi((4-)^{((2))})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(6,1,0)\\&\psi_Z(\varepsilon_0\uparrow\uparrow5)=\psi(1-5)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(6,1,1)\\&\psi_Z(\varepsilon_0\uparrow\uparrow6)=\psi(1-6)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(6,1,1)(7,1,1)\\&\psi_Z(\varepsilon_0\uparrow\uparrow7)=\psi(1-7)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,1)(5,1,1)(6,1,1)(7,1,1)(8,1,1)\\&\LARGE\color{red}{\psi_Z[\varepsilon_1](\varepsilon_1)=(0,0,0)(1,1,1)(2,2,0)=\psi(\lambda\alpha.(\alpha+1)-\Pi_0)=\rm SSO}\end{align}</nowiki></div></td></tr> </table>

Tabelog http://wiki.googology.top/index.php?title=fffz%E5%88%86%E6%9E%90Part7&diff=2327&oldid=prev Z：创建页面，内容为“本词条展示fffz分析的第七部分。使用<math>MOCF</math>和BMS对照 <nowiki>\begin{align}s\\&\psi_Z[\varepsilon_0^{\varepsilon_0^\omega}](\varepsilon_0^{\varepsilon_0^\omega})=\psi((2-)^\omega)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega})=\psi((2-)^{((2))})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}+\varepsilon_0)=\psi((2-)^{(1-2)})…” 2025-08-24T03:49:33Z

<p>创建页面，内容为“本词条展示<a href="/index.php/Fake_Fake_Fake_Zeta" title="Fake Fake Fake Zeta">fffz</a>分析的第七部分。使用<math>MOCF</math>和<a href="/index.php?title=Bashicu%E7%9F%A9%E9%98%B5&action=edit&redlink=1" class="new" title="Bashicu矩阵（页面不存在）">BMS</a>对照 <nowiki>\begin{align}s\\&\psi_Z[\varepsilon_0^{\varepsilon_0^\omega}](\varepsilon_0^{\varepsilon_0^\omega})=\psi((2-)^\omega)=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,0,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega})=\psi((2-)^{((2))})=(0,0,0)(1,1,1)(2,1,1)(3,1,1)(4,1,0)\\&\psi_Z(\varepsilon_0^{\varepsilon_0^\omega}+\varepsilon_0)=\psi((2-)^{(1-2)})…”</p> <a href="http://wiki.googology.top/index.php?title=fffz%E5%88%86%E6%9E%90Part7&diff=2327">显示更改</a>

Z