稳定序数：修订间差异

${\displaystyle L_{\alpha }}$ 是 ${\displaystyle L_{\beta }}$ 的 ${\displaystyle {\mathrm{\Sigma }}_n}$ 初等子结构，如果任取 ${\displaystyle {\mathrm{\Sigma }}_n}$ 公式 ${\displaystyle \phi }$ 均有单射 ${\displaystyle j}$ 满足${\displaystyle L_{\alpha }\models \phi (x_1,x_2,\cdots )}$ 等价于 ${\displaystyle L_{\beta }\models \phi (j(x_1),j(x_2),\cdots )}$，也称其为 ${\displaystyle L_{\alpha }{\mathrm{\Sigma }}_n\text{稳定到}{L}_{\beta }}$。

除此外，我们还有 ${\displaystyle L_{\alpha }}$ 是 ${\displaystyle L_{\beta }-{\mathrm{\Pi }}_n\text{-反射}}$ 用于表达一些精细的层级，其中 ${\displaystyle L_{\alpha }{\mathrm{\Sigma }}_1\text{稳定到}{L}_{\beta }}$
（如未特别说明，下文的稳定到均为 ${\displaystyle {\mathrm{\Sigma }}_1}$ 稳定到）

函数式定义：

${\displaystyle L_{\alpha }}$ 是 ${\displaystyle L_{f(\alpha )}\text{-}{\mathrm{\Pi }}_n}$ 反射 onto ${\displaystyle X}$，当且仅当对于任意 ${\displaystyle {\mathrm{\Pi }}_n}$ 公式 ${\displaystyle \phi }$ 及参数 ${\displaystyle \gamma \in L_{\alpha }}$、${\displaystyle {\gamma }^{\prime }\in L_{{\alpha }^{\prime }}}$（其中 ${\displaystyle {\alpha }^{\prime }\in \alpha \cap X}$），有 ${\displaystyle L_{f(\alpha )}\models \phi (\alpha ,\gamma )\to L_{f({\alpha }^{\prime })}\models \phi ({\alpha }^{\prime },{\gamma }^{\prime })}$。

序数式定义：

${\displaystyle L_{\alpha }}$ 是 ${\displaystyle L_{\beta }\text{-}{\mathrm{\Pi }}_n}$ 反射 onto ${\displaystyle X}$，当且仅当对于任意 ${\displaystyle {\mathrm{\Pi }}_n}$ 公式 ${\displaystyle \phi }$ 及参数 ${\displaystyle \gamma \in \alpha }$、${\displaystyle {\gamma }^{\prime }\in {\alpha }^{\prime }}$（其中 ${\displaystyle {\beta }^{\prime }\in \alpha }$ 且 ${\displaystyle {\alpha }^{\prime }\in \alpha \cap X}$），有 ${\displaystyle L_{\beta }\models \phi (\alpha ,\gamma )\to L_{{\beta }^{\prime }}\models \phi ({\alpha }^{\prime },{\gamma }^{\prime })}$。

关于函数式定义，由于 ${\displaystyle \omega }$-ply 的顶点下成员均为 ${\displaystyle \omega }$-ply，这会触发 ${\displaystyle f}$ 与 ${\displaystyle \alpha }$ 的某种不动点，导致无法继续推进。

参见词条 Σ1 稳定序数、方括号稳定。

稳定序数有如下路径：

${\displaystyle \beta =\min \alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}=\text{psd.}{\mathrm{\Pi }}_{\omega }}$

${\displaystyle \beta =\underset{n\in \omega }{\sup }\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}=\min {\mathrm{\Pi }}_1\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\underset{n\in {\omega }^2}{\sup }\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}=\min {\mathrm{\Pi }}_1\text{onto}{\mathrm{\Pi }}_1\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\underset{n\in \beta }{\sup }\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}=\min {\mathrm{\Pi }}_1{\text{onto}}^{(1,0)}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\underset{n\in \beta }{\sup }\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}(\beta \in {\mathrm{\Pi }}_2)=\min {\mathrm{\Pi }}_2\cap {\mathrm{\Pi }}_1\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\underset{n\in \omega }{\sup }\{\alpha :{\mathrm{\Pi }}_2\cap {\mathrm{\Pi }}_1\text{onto}\{L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}\}=\min {\mathrm{\Pi }}_1\text{onto}{\mathrm{\Pi }}_2\cap {\mathrm{\Pi }}_1\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\underset{n\in \beta }{\sup }\{\alpha :{\mathrm{\Pi }}_2\cap {\mathrm{\Pi }}_1\text{onto}\{L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}\}(\beta \in {\mathrm{\Pi }}_2)=\min {\mathrm{\Pi }}_2\cap {\mathrm{\Pi }}_1\text{onto}{\mathrm{\Pi }}_2\cap {\mathrm{\Pi }}_1\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\underset{n\in \beta }{\sup }\{\alpha :\{n:{\mathrm{\Pi }}_2\cap {\mathrm{\Pi }}_1{\text{onto}}^n\{L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}\}=\min {\mathrm{\Pi }}_2\cap {\mathrm{\Pi }}_1{\text{onto}}^{(1,0)}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\underset{n\in \beta }{\sup }\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}(\beta \in {\mathrm{\Pi }}_2\text{onto}{\mathrm{\Pi }}_2)=\min ({\mathrm{\Pi }}_2\text{onto}{\mathrm{\Pi }}_2)\cap {\mathrm{\Pi }}_1\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\underset{n\in \beta }{\sup }\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}(\beta \in {\mathrm{\Pi }}_3)=\min {\mathrm{\Pi }}_3\cap {\mathrm{\Pi }}_1\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\underset{n\in \beta }{\sup }\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}(L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1})=\min \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\cap {\mathrm{\Pi }}_1\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}(\beta \in {\mathrm{\Pi }}_n)}$

${\displaystyle \beta =\underset{n\in \omega }{\sup }\{\alpha :\{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\cap {\mathrm{\Pi }}_1\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}\}=\min {\mathrm{\Pi }}_1\text{onto}\{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\cap {\mathrm{\Pi }}_1\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\underset{n\in \beta }{\sup }\{\alpha :\{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\cap {\mathrm{\Pi }}_1\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}\}(\beta \in {\mathrm{\Pi }}_2)=\min {\mathrm{\Pi }}_2\cap {\mathrm{\Pi }}_1\text{onto}\{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\cap {\mathrm{\Pi }}_1\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\underset{n\in \beta }{\sup }\{\alpha :\{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\cap {\mathrm{\Pi }}_1\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}\}(L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1})=\min \{\gamma :L_{\gamma }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\gamma +1}\}\cap {\mathrm{\Pi }}_1\text{onto}\{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\cap {\mathrm{\Pi }}_1\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\underset{n\in \beta }{\sup }\{\alpha :\{n:(\{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\cap {\mathrm{\Pi }}_1\text{onto}{)}^n\}\}=\min (\{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\cap {\mathrm{\Pi }}_1\text{onto}{)}^{(1,0)}}$

${\displaystyle \beta =\min {\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\})}$

${\displaystyle \beta =\underset{n\in \beta }{\sup }\{\alpha :{\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}\}=\min {\mathrm{\Pi }}_1{\text{onto}}^{(1,0)}{\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\underset{n\in \beta }{\sup }\{\alpha :{\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}\}(\beta \in {\mathrm{\Pi }}_2)=\min {\mathrm{\Pi }}_2\cap {\mathrm{\Pi }}_1\text{onto}{\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\underset{n\in \beta }{\sup }\{\alpha :{\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}\}(L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1})=\min \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\cap {\mathrm{\Pi }}_1\text{onto}{\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\underset{n\in \beta }{\sup }\{\alpha :{\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}\}(\beta \in {\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\})=\min {\mathrm{\Pi }}_2\text{onto}\{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\cap {\mathrm{\Pi }}_1\text{onto}{\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\underset{n\in \beta }{\sup }\{\alpha :\{x:({\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\})\cap {\mathrm{\Pi }}_1\text{onto}{)}^x\}\}=\min ({\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}\cap {\mathrm{\Pi }}_1\text{onto}{)}^{(1,0)}}$

${\displaystyle \beta =\min {\mathrm{\Pi }}_2\text{onto}{\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta ={\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}(\beta \in {\mathrm{\Pi }}_3)=\min {\mathrm{\Pi }}_3\cap {\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta ={\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}(L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1})=\min \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\cap {\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\min {\mathrm{\Pi }}_3\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\min \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\}}$

${\displaystyle \beta =\min \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\wedge L_{\alpha }=\min L_{\alpha +1}-{\mathrm{\Pi }}_2\})}$

${\displaystyle \beta =\min (\{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\text{onto}{)}^{(1,0)}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\wedge L_{\alpha }=\min L_{\alpha +1}-{\mathrm{\Pi }}_2\})}$

${\displaystyle \beta =\{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\wedge L_{\alpha }=L_{\alpha +1}-{\mathrm{\Pi }}_2\})(\beta \in \{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\wedge L_{\alpha }=L_{\alpha +1}-{\mathrm{\Pi }}_2\})=\min \{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\wedge L_{\alpha }=L_{\alpha +1}-{\mathrm{\Pi }}_2\}\cap \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\text{onto}\{\gamma :L_{\gamma }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\gamma +1}\wedge L_{\gamma }=L_{\gamma +1}-{\mathrm{\Pi }}_2\}}$

${\displaystyle \beta =\min \{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\wedge L_{\alpha }=L_{\alpha +1}-{\mathrm{\Pi }}_2\}\text{onto}\{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\wedge L_{\beta }=L_{\beta +1}-{\mathrm{\Pi }}_2\}}$

${\displaystyle \beta =\min (\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +1}\wedge L_{\alpha }=L_{\alpha +1}-{\mathrm{\Pi }}_2\}\text{onto}{)}^{(1,0)}}$

${\displaystyle \beta =\min \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}(L_{\beta }=L_{\beta +1}-{\mathrm{\Pi }}_3)}$

${\displaystyle \beta =\min \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_2}{L}_{\beta +1}\}(L_{\beta }=L_{\beta +1}-\text{psd.}{\mathrm{\Pi }}_{\omega })}$${\displaystyle \beta =\min {\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +2}\}}$

${\displaystyle \beta =\min \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +2}\}\cap {\mathrm{\Pi }}_2\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +2}\}}$

${\displaystyle \beta =\min {\mathrm{\Pi }}_3\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +2}\}}$

${\displaystyle \beta =\min \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +2}\}}$

${\displaystyle \beta =\min \{\gamma :L_{\gamma }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\gamma +2}\}\cap \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\}\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +2}\}}$

${\displaystyle \beta =\min \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +1}\wedge L_{\beta }=L_{\beta +1}-{\mathrm{\Pi }}_2\}\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +2}\}}$

${\displaystyle \beta =\min \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +2}\}\text{onto}\{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha +2}\}}$

${\displaystyle \beta =\min \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +2}\wedge L_{\beta }=L_{\beta +2}-{\mathrm{\Pi }}_2\}}$

${\displaystyle \beta =\min \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +3}\wedge L_{\beta }=L_{\beta +2}-\text{psd.}{\mathrm{\Pi }}_{\omega }\}}$

${\displaystyle \beta =\min \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +\omega }\}}$

${\displaystyle \beta =\min \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta \times 2}\}}$

${\displaystyle \beta =\min \{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta +\alpha +1}\}(\alpha =\min \{\alpha :L_{\alpha }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\alpha \times 2}\})}$

${\displaystyle \beta =\text{2nd}\{\beta :L_{\beta }{\prec }_{{\mathrm{\Sigma }}_1}{L}_{\beta \times 2}\}}$

${\displaystyle \beta }$是${\displaystyle {\mathrm{\Pi }}_1}$ onto {${\displaystyle \alpha :L_{\alpha }}$稳定到${\displaystyle L_{\alpha *2}}$}的最小成员

${\displaystyle \beta }$是${\displaystyle {\mathrm{\Pi }}_2}$${\displaystyle \cap ({\mathrm{\Pi }}_1}$ onto {${\displaystyle \alpha :L_{\alpha }}$稳定到${\displaystyle L_{\alpha *2}}$})的最小成员

${\displaystyle \beta }$是{${\displaystyle \beta :L_{\beta }}$稳定到${\displaystyle L_{\beta +\gamma }}$}${\displaystyle \cap {\mathrm{\Pi }}_1}$ onto {${\displaystyle \alpha :L_{\alpha }}$稳定到${\displaystyle L_{\alpha *2}}$}的最小成员，其中${\displaystyle \gamma }$是满足${\displaystyle L_{\gamma }}$稳定到${\displaystyle L_{\gamma *2}}$的最小序数

${\displaystyle \beta }$是{${\displaystyle \beta :L_{\beta }}$稳定到${\displaystyle L_{\beta +\gamma }}$}${\displaystyle \cap {\mathrm{\Pi }}_1}$ onto {${\displaystyle \alpha :L_{\alpha }}$稳定到${\displaystyle L_{\alpha *2}}$}的最小成员，其中${\displaystyle \gamma }$是上一条中的${\displaystyle \beta }$

${\displaystyle \beta }$是{${\displaystyle \beta :L_{\beta }}$稳定到${\displaystyle L_{\beta *2}}$}${\displaystyle \cap {\mathrm{\Pi }}_1}$ onto {${\displaystyle \alpha :L_{\alpha }}$稳定到${\displaystyle L_{\alpha *2}}$}的最小成员

${\displaystyle \beta }$是${\displaystyle {\mathrm{\Pi }}_2}$ onto {${\displaystyle \alpha :L_{\alpha }}$稳定到${\displaystyle L_{\alpha *2}}$}的最小成员

${\displaystyle \beta }$是{${\displaystyle \beta :L_{\beta }}$稳定到${\displaystyle L_{\beta +1}}$} onto {${\displaystyle \alpha :L_{\alpha }}$稳定到${\displaystyle L_{\alpha *2}}$}的最小成员

${\displaystyle \beta }$是{${\displaystyle \beta :L_{\beta }}$稳定到${\displaystyle L_{\beta +\gamma }}$} onto {${\displaystyle \alpha :L_{\alpha }}$稳定到${\displaystyle L_{\alpha *2}}$}的最小成员，其中${\displaystyle \gamma }$是最小的${\displaystyle L_{\gamma }}$是${\displaystyle L_{\gamma *2}}$

${\displaystyle \beta }$是{${\displaystyle \beta :L_{\beta }}$稳定到${\displaystyle L_{\beta *2}}$} onto {${\displaystyle \alpha :L_{\alpha }}$稳定到${\displaystyle L_{\alpha *2}}$}的最小成员

${\displaystyle L_{\beta }}$是${\displaystyle L_{\beta *2}}$-${\displaystyle {\mathrm{\Pi }}_2}$反射

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\beta *2+1}}$

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{{\beta }^2}}$

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{{\mathrm{\Omega }}_{\beta +1}}}$

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$，且${\displaystyle L_{\gamma }}$稳定到${\displaystyle L_{\gamma +1}}$，则${\displaystyle L_{\gamma }}$是首个大于${\displaystyle \beta }$序数满足${\displaystyle L_{\gamma }}$稳定到${\displaystyle L_{\gamma +1}}$

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$稳定到${\displaystyle L_{\gamma +1}}$，且${\displaystyle L_{\beta }}$是${\displaystyle L_{\gamma +1}}$-${\displaystyle {\mathrm{\Pi }}_2}$反射

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$稳定到${\displaystyle L_{\gamma +1}}$，且${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma +2}}$

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$稳定到${\displaystyle L_{\gamma +1}}$，且${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma +\omega }}$

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$稳定到${\displaystyle L_{\gamma +1}}$，且${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma *2}}$

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$稳定到${\displaystyle L_{\gamma +1}}$，且${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{{\mathrm{\Omega }}_{\gamma +1}}}$

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$稳定到${\displaystyle L_{\gamma +1}}$，且${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\alpha }}$稳定到${\displaystyle L_{\alpha +1}}$，对${\displaystyle \gamma \in \alpha }$

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{{\gamma }_n}}$稳定到${\displaystyle L_{{\gamma }_n+1}}$，对于${\displaystyle n\in \omega }$和${\displaystyle {\gamma }_n\in {\gamma }_{n+1}}$，则L_{\gamma}</math>是${\displaystyle {\mathrm{\Pi }}_1}$ onto {${\displaystyle \alpha :L_{\alpha }}$稳定到${\displaystyle L_{\alpha +1}}$}的最小成员

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$，其中${\displaystyle \gamma }$是${\displaystyle {\mathrm{\Pi }}_1}$ onto ${\displaystyle {\mathrm{\Pi }}_1}$ onto {${\displaystyle \alpha :L_{\alpha }}$稳定到${\displaystyle L_{\alpha +1}}$}的最小成员

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$，其中${\displaystyle \gamma }$是${\displaystyle {\mathrm{\Pi }}_2\cap ({\mathrm{\Pi }}_1}$ onto {${\displaystyle \alpha :L_{\alpha }}$稳定到${\displaystyle L_{\alpha +1}}$})的最小成员

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$，其中${\displaystyle \gamma }$是{${\displaystyle \beta :L_{\beta }}$稳定到${\displaystyle L_{\beta +1}}$}${\displaystyle \cap ({\mathrm{\Pi }}_1}$ onto {${\displaystyle \alpha :L_{\alpha }}$稳定到${\displaystyle L_{\alpha +1}}$})的最小成员

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$，其中${\displaystyle \gamma }$是${\displaystyle {\mathrm{\Pi }}_2}$ onto {${\displaystyle \alpha :L_{\alpha }}$稳定到${\displaystyle L_{\alpha +1}}$}的最小成员

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$，其中${\displaystyle \gamma }$是{${\displaystyle \beta :L_{\beta }}$稳定到${\displaystyle L_{\beta +1}}$} onto {${\displaystyle \alpha :L_{\alpha }}$稳定到${\displaystyle L_{\alpha +1}}$}的最小成员

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$，其中${\displaystyle L_{\gamma }}$是${\displaystyle L_{\gamma +1}}$-${\displaystyle {\mathrm{\Pi }}_2}$反射

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$稳定到${\displaystyle L_{\gamma +2}}$

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$稳定到${\displaystyle L_{\gamma +\beta }}$

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$稳定到${\displaystyle L_{\gamma *2}}$

${\displaystyle L_{\beta }}$稳定到${\displaystyle L_{\gamma }}$稳定到${\displaystyle L_{\zeta }}$稳定到${\displaystyle L_{\zeta +1}}$

${\displaystyle L_{{\beta }_x}}$稳定到${\displaystyle L_{{\beta }_{x+1}}}$，对${\displaystyle n\in \omega }$，则${\displaystyle {\beta }_n}$是${\displaystyle \omega }$-ply，常规稳定链的终点，在此后需要涉及更高阶的反射

Racheline 证明 BMS 良序的文章中，给出了 BMS 到 ${\displaystyle {\mathrm{\Sigma }}_n}$-稳定的一个单射。

我们把 BMS 中第 n 行的父项关系记作 <n，每个列当成一个单独的序数。如此翻译，就得到了一个 ${\displaystyle {\mathrm{\Sigma }}_n}$ 稳定的表达式。

如 ${\displaystyle (0,0)(1,1)}$，(0,0) 记作 α，(1,1) 记作 β，注意到第一行上 ${\displaystyle \alpha <1\beta }$，第二行上 ${\displaystyle \alpha <2\beta }$，翻译过来可只写${\displaystyle \alpha <2\beta }$。

又如 ${\displaystyle (0,0)(1,1)(2,1)}$ 翻译成 ${\displaystyle a<2(b,c),b<1c}$。

又如 ${\displaystyle (0,0)(1,1)(2,1)(3,1)(1,1)(2,1)(3,0)(4,1)(5,1)(6,1)}$，翻译成 ${\displaystyle a<2(b,c,d,e,f),b<1c<1d,b,c,d\in e,e<1f<1g,g<2(j,k,l),j<1k<1l}$。

又如 ${\displaystyle a<2(b,d),b<2(c,e),c<1e,(b,c,e)\in d}$，翻译为 ${\displaystyle (0,0)(1,1)(2,2)(3,2)(1,1)}$。其中属于关系对应的是 BMS 对应项的位置，然后 a 稳定到 b 暗含 a 属于 b。

注意并非满射。如 ${\displaystyle a<1b<2c}$ 在稳定中标准而在 BMS 中是 ${\displaystyle (0,0)(1,0)(2,1)}$ 不标准。