你说得对,但是感觉不如
C_0(\alpha,\beta) &=& \{0\} \cup \beta \\
C_{n+1}(\alpha,\beta) &=& \{\gamma+\delta, \Psi^{\kappa,\nu,\gamma}_\pi(\eta), \chi^{\nu,\gamma}_{\pi'}(\eta), \text{Б}\omega^\gamma \mid \gamma,\delta,\eta,\nu,\pi,\pi',\kappa\in C_n(\alpha,\beta)\land \eta < \alpha \land \pi \in \text{Adm} \land \\
&&\;\;\;\;\pi' \in \mathbb{L}^ω_{\text{Б}}\} \\
C(\alpha,\beta) &=& \bigcup_{n\in\omega} C_n(\alpha,\beta) \\
\Psi^{\kappa,\mu,\gamma}_\pi(\alpha) &=& \text{min}\{\xi\mid\text{sup }(C(\alpha,\xi)\cap\pi) = \xi\land \xi\in\mathtt{BOX}_{\Xi[\kappa]}\land (\kappa \in C(\text{Б},\xi) \lor \\
&&\;\;\;\; (\forall J\in \phi(0,M,\Xi,\mathtt{BOX}_ω;611)[J\doublebarwedge \acute{H} + \hat{M}^2]\land \\
&&\;\;\;\;\mu \& \beta_0 \bigstar \Bbbk^2(\Omega_h) \wr_{::}^\# RR_{RR}?(i+e^{i^\alpha\pi^\kappa}\cup ψZ[Ω](Ω)))) \\
\chi^{\nu,\gamma}_\pi(\alpha) &=& \text{Cosmological constant}^{\Phi(1,0)}\{\cdot\}Ю^{Э_\gamma}\&\&^2(\$R_{\frac{j+1}{2}})\langle\zeta^{\aleph_\nu}\rangle :: \\
&&\;\;\;\;[(\nu,\gamma)![[1,2](1)2]]\{LLL,X\uparrow\uparrow X^2\}_{\mu,\pi}\%\dot{B} + \\
&&\;\;\;\;\{ω,C(ψ_H(H^{C(1\{\text{Yog-sothoth}:3\}69393;^{;+1}3)})2;ω3+1;;7\{2$0\}A)[2,2,2[ω+1]66]4,55\}