weak Veblen 函数

weak Veblen 函数（又称“弱 φ”、“弱 Veblen”等），是 Veblen 函数的变体。

定义

现在有两种 Veblen 函数的变体可被称为 weak Veblen。

如果称 Veblen 函数的末位 + 1 等价于跳到下一个 ε 点（不动点进制），定义 Veblen 函数为 $F P φ$ ，那么可以直观地定义下面两种weak Veblen：

若 weak Veblen 函数的末位 + 1 对应于其序数值 $\times ω$ ，则称其为 $\times ω ϕ$ 。

若 weak Veblen 函数的末位 + 1 对应于其序数值 $+ 1$ ，则称其为 $+ 1 φ$ 。

以下是两种 weak Veblen 直到序元级别的定义：

$+ 1 ϕ$

$φ (#, (α + 1)$ @ $(β + 1), 0$ @ $0) [0] = 0$ 。
$φ (#, (α + 1)$ @ $(β + 1), 0$ @ $0) [n + 1] = φ (#, α$ @ $(β + 1), φ (#, (α + 1)$ @ $(β + 1), 0$ @ $0) [n]$ @ $β)$ 。
对于极限序数 $α$ ， $φ (#, α$ @ $β) [n] = φ (#, α [n]$ @ $β)$ 。
对于极限序数 $β$ ， $φ (#, (α + 1)$ @ $β, 0$ @ $0) [n] = φ (#, α$ @ $β, 1$ @ $β [n])$ 。
$φ (#, (γ + 1)$ @ $0) = φ (#, γ$ @ $0) + 1$ 。

$\times ω ϕ$

$φ (#, (α + 1)$ @ $(β + 1), 0$ @ $0) [0] = 0$ 。
$φ (#, (α + 1)$ @ $(β + 1), 0$ @ $0) [n + 1] = φ (#, α$ @ $(β + 1), φ (#, (α + 1)$ @ $(β + 1), 0$ @ $0) [n]$ @ $β)$ 。
对于极限序数 $α$ ， $φ (#, α$ @ $β) [n] = φ (#, α [n]$ @ $β)$ 。
对于极限序数 $β$ ， $φ (#, (α + 1)$ @ $β, 0$ @ $0) [n] = φ (#, α$ @ $β, 1$ @ $β [n])$ 。
$φ (#, (γ + 1)$ @ $0) = φ (#, γ$ @ $0) \cdot φ (1)$ 。

分析

以下分析中，左为 $F P ϕ$ ，中为 $\times ω ϕ$ ，右为 $+ 1 ϕ$ 。

$φ (0) = φ (0) = φ (0)$

$φ (0) \cdot 2 = φ (0) \cdot 2 = φ (φ (0))$

$φ (0) \cdot 3 = φ (0) \cdot 3 = φ (φ (φ (0)))$

$φ (1) = φ (1) = φ (1, 0) =$ ω

$φ (1) + 1 = φ (1) + 1 = φ (1, 1)$

$φ (1) + 2 = φ (1) + 2 = φ (1, 2)$

$φ (1) \cdot 2 = φ (1) \cdot 2 = φ (1, φ (1, 0))$

$φ (1) \cdot 2 + 1 = φ (1) \cdot 2 + 1 = φ (1, φ (1, 1))$

$φ (1) \cdot 2 + 2 = φ (1) \cdot 2 + 2 = φ (1, φ (1, 2))$

$φ (1) \cdot 3 = φ (1) \cdot 3 = φ (1, φ (1, φ (1, 0)))$

$φ (2) = φ (2) = φ (2, 0)$

$φ (2) + 1 = φ (2) + 1 = φ (2, 1)$

$φ (2) + 2 = φ (2) + 2 = φ (2, 2)$

$φ (2) + φ (1) = φ (2) + φ (1) = φ (2, φ (1, 0))$

$φ (2) \cdot 2 = φ (2) \cdot 2 = φ (2, φ (2, 0))$

$φ (2) \cdot 3 = φ (2) \cdot 3 = φ (2, φ (2, φ (2, 0)))$

$φ (3) = φ (3) = φ (3, 0)$

$φ (3) + φ (2) = φ (3) + φ (2) = φ (3, φ (2, 0))$

$φ (4) = φ (4) = φ (4, 0)$

$φ (φ (1)) = φ (φ (1)) = φ (φ (1, 0), 0)$

$φ (φ (1)) + 1 = φ (φ (1)) + 1 = φ (φ (1, 0), 1)$

$φ (φ (1)) + φ (1) = φ (φ (1)) + φ (1) = φ (φ (1, 0), φ (1, 0))$

$φ (φ (1)) + φ (2) = φ (φ (1)) + φ (2) = φ (φ (1, 0), φ (2, 0))$

$φ (φ (1)) \cdot 2 = φ (φ (1)) \cdot 2 = φ (φ (1, 0), φ (φ (1, 0), 0))$

$φ (φ (1) + 1) = φ (φ (1) + 1) = φ (φ (1, 1), 0)$

$φ (φ (1) + 2) = φ (φ (1) + 2) = φ (φ (1, 2), 0)$

$φ (φ (1) + 3) = φ (φ (1) + 3) = φ (φ (1, 3), 0)$

$φ (φ (1) \cdot 2) = φ (φ (1) \cdot 2) = φ (φ (1, φ (1, 0)), 0)$

$φ (φ (1) \cdot 2 + 1) = φ (φ (1) \cdot 2 + 1) = φ (φ (1, φ (1, 1)), 0)$

$φ (φ (1) \cdot 3) = φ (φ (1) \cdot 3) = φ (φ (1, φ (1, φ (1, 0))), 0)$

$φ (φ (2)) = φ (φ (2)) = φ (φ (2, 0), 0)$

$φ (φ (2) + 1) = φ (φ (2) + 1) = φ (φ (2, 1), 0)$

$φ (φ (2) + φ (1)) = φ (φ (2) + φ (1)) = φ (φ (2, φ (1, 0)), 0)$

$φ (φ (3)) = φ (φ (3)) = φ (φ (3, 0), 0)$

$φ (φ (φ (1))) = φ (φ (φ (1))) = φ (φ (φ (1, 0), 0), 0)$

$φ (φ (φ (1)) + 1) = φ (φ (φ (1)) + 1) = φ (φ (φ (1, 0), 1), 0)$

$φ (φ (φ (1)) + φ (1)) = φ (φ (φ (1)) + φ (1)) = φ (φ (φ (1, 0), φ (1, 0)), 0)$

$φ (φ (φ (1)) \cdot 2) = φ (φ (φ (1)) \cdot 2) = φ (φ (φ (1, 0), φ (φ (1, 0), 0)), 0)$

$φ (φ (φ (1) + 1)) = φ (φ (φ (1) + 1)) = φ (φ (φ (1, 1), 0), 0)$

$φ (φ (φ (2))) = φ (φ (φ (2))) = φ (φ (φ (2, 0), 0), 0)$

$φ (φ (φ (3))) = φ (φ (φ (3))) = φ (φ (φ (3, 0), 0), 0)$

$φ (φ (φ (φ (1)))) = φ (φ (φ (φ (1)))) = φ (φ (φ (φ (1, 0), 0), 0), 0)$

$φ (φ (φ (φ (φ (1))))) = φ (φ (φ (φ (φ (1))))) = φ (φ (φ (φ (φ (1, 0), 0), 0), 0), 0)$

$φ (1, 0) = φ (1, 0) = φ (1, 0, 0) =$ ε0

$φ (1, 0) + 1 = φ (1, 0) + 1 = φ (1, 0, 1)$

$φ (1, 0) + φ (1) = φ (1, 0) + φ (1) = φ (1, 0, φ (1, 0))$

$φ (1, 0) \cdot 2 = φ (1, 0) \cdot 2 = φ (1, 0, φ (1, 0, 0))$

$φ (1, 0) \cdot 3 = φ (1, 0) \cdot 3 = φ (1, 0, φ (1, 0, φ (1, 0, 0)))$

$φ (1, 0) \cdot φ (1) = φ (1, 1) = φ (1, 1, 0)$

$φ (1, 0) \cdot φ (1) \cdot 2 = φ (1, 1) \cdot 2 = φ (1, 1, φ (1, 1, 0))$

$φ (1, 0) \cdot φ (2) = φ (1, 2) = φ (1, 2, 0)$

$φ (1, 0) \cdot φ (φ (1)) = φ (1, φ (1)) = φ (1, φ (1, 0), 0)$

$φ (1, 0) \cdot φ (φ (1) + 1) = φ (1, φ (1) + 1) = φ (1, φ (1, 1), 0)$

$φ (1, 0) \cdot φ (φ (2)) = φ (1, φ (2)) = φ (1, φ (2, 0), 0)$

$φ (1, 0) \cdot φ (φ (φ (1))) = φ (1, φ (φ (1))) = φ (1, φ (φ (1, 0), 0), 0)$

$φ (1, 0)^{2} = φ (1, φ (1, 0)) = φ (1, φ (1, 0, 0), 0)$

$φ (1, 0)^{2} \cdot φ (1) = φ (1, φ (1, 0) + 1) = φ (1, φ (φ (1, 0, 0)), 0)$

$φ (1, 0)^{2} \cdot φ (φ (φ (1))) = φ (1, φ (1, 0) + φ (φ (1))) = φ (1, φ (1, 0, φ (φ (1, 0), 0)), 0)$

$φ (1, 0)^{3} = φ (1, φ (1, 0) \cdot 2) = φ (1, φ (1, 0, φ (1, 0, 0), 0), 0)$

$φ (1, 0)^{φ (1)} = φ (1, φ (1, 1)) = φ (1, φ (1, 1, 0), 0)$

$φ (1, 0)^{φ (1)} \cdot φ (1) = φ (1, φ (1, 1) + 1) = φ (1, φ (φ (1, 1, 0)), 0)$

$φ (1, 0)^{φ (1)} \cdot φ (φ (1)) = φ (1, φ (1, 1) + 2) = φ (1, φ (φ (φ (1, 1, 0))), 0)$

$φ (1, 0)^{(φ (1) + 1)} = φ (1, φ (1, 1) + φ (1, 0)) = φ (1, φ (1, 1, φ (1, 0, 0)), 0)$

$φ (1, 0)^{(φ (1) \cdot 2)} = φ (1, φ (1, 1) \cdot 2) = φ (1, φ (1, 1, φ (1, 1, 0)), 0)$

<math>\varphi(1,0)^{\varphi(1)^{2}}=\varphi(1,\varphi(1,2))=\varphi(1,\varphi(1,2,0),0)</math>

<math>\varphi(1,0)^{\varphi(1)^{\varphi(1)}}=\varphi(1,\varphi(1,\varphi(1)))=\varphi(1,\varphi(1,\varphi(1,0),0),0)</math>

$φ (1, 0)^{φ (1, 0)} = φ (1, φ (1, φ (1, 0))) = φ (1, φ (1, φ (1, 0, 0), 0), 0)$

$φ (1, 0)^{(φ (1, 0) + 1)} = φ (1, φ (1, φ (1, 0)) + φ (1, 0)) = φ (1, φ (1, φ (1, 0, 0), φ (1, 0, 0)), 0)$

$φ (1, 0)^{(φ (1, 0) \cdot φ (1))} = φ (1, φ (1, φ (1, 0)) + φ (1, 1)) = φ (1, φ (1, φ (1, 0, 0), φ (1, 1, 0)), 0)$

<math>\varphi(1,0)^{\varphi(1,0)^{2}}=\varphi(1,\varphi(1,\varphi(1,2)))=\varphi(1,\varphi(1,\varphi(1,2,0),0),0)</math>

<math>\varphi(1,0)^{\varphi(1,0)^{\varphi(1)}}=\varphi(1,\varphi(1,\varphi(1,\varphi(1))))=\varphi(1,\varphi(1,\varphi(1,\varphi(1,0),0),0),0)</math>

<math>\varphi(1,0)^{\varphi(1,0)^{\varphi(1,0)}}=\varphi(1,\varphi(1,\varphi(1,\varphi(1,0))))=\varphi(1,\varphi(1,\varphi(1,\varphi(1,0,0),0),0),0)</math>

$φ (1, 1) = φ (2, 0) = φ (2, 0, 0)$

$φ (1, 1) \cdot φ (1, 0) = φ (2, φ (1, 0)) = φ (2, φ (1, 0, 0), 0)$

$φ (1, 1) \cdot φ (1, 0)^{φ (1)} = φ (2, φ (1, φ (1, 1))) = φ (2, φ (1, φ (1, 1, 0), 0), 0)$

$φ (1, 1) \cdot φ (1, 0)^{φ (1, 0)} = φ (2, φ (1, φ (1, φ (1, 0)))) = φ (2, φ (1, φ (1, φ (1, 0, 0), 0), 0), 0)$

$φ (1, 1)^{2} = φ (2, φ (2, 0)) = φ (2, φ (2, 0, 0), 0)$

$φ (1, 1)^{φ (1)} = φ (2, φ (2, 1)) = φ (2, φ (2, φ (1, 0), 0), 0)$

$φ (1, 1)^{φ (1, 0)} = φ (2, φ (2, φ (1, 0))) = φ (2, φ (2, φ (1, 0, 0), 0), 0)$

$φ (1, 1)^{φ (1, 1)} = φ (2, φ (2, φ (2, 0))) = φ (2, φ (2, φ (2, 0, 0), 0), 0)$

$φ (1, 2) = φ (3, 0) = φ (3, 0, 0)$

$φ (1, φ (1)) = φ (φ (1), 0) = φ (φ (1, 0), 0, 0)$

$φ (1, φ (1)) \cdot φ (1, 0) = φ (φ (1), φ (1, 0)) = φ (φ (1, 0), φ (1, 0, 0), 0)$

$φ (1, φ (1)) \cdot φ (1, 1) = φ (φ (1), φ (1, 1)) = φ (φ (1, 0), φ (1, 1, 0), 0)$

$φ (1, φ (1))^{2} = φ (φ (1), φ (1, φ (1))) = φ (φ (1, 0), φ (1, φ (1, 0), 0))$

$φ (1, φ (1) + 1) = φ (φ (1) + 1, 0) = φ (φ (1, 1), 0, 0)$

$φ (1, φ (1) + 2) = φ (φ (1) + 2, 0) = φ (φ (1, 2), 0, 0)$

$φ (1, φ (1) \cdot 2) = φ (φ (1) \cdot 2, 0) = φ (φ (1, φ (1, 0)), 0, 0)$

$φ (1, φ (1)^{2}) = φ (φ (2), 0) = φ (φ (2, 0), 0, 0)$

$φ (1, φ (1)^{3}) = φ (φ (3), 0) = φ (φ (3, 0), 0, 0)$

$φ (1, φ (1)^{φ (1)}) = φ (φ (φ (1)), 0) = φ (φ (φ (1, 0), 0), 0, 0)$

$φ (1, φ (1, 0)) = φ (φ (1, 0), 0) = φ (φ (1, 0, 0), 0, 0)$

$φ (1, φ (1, 0) + 1) = φ (φ (1, 0) + 1, 0) = φ (φ (1, 0, 1), 0, 0)$

$φ (1, φ (1, 0) \cdot φ (1)) = φ (φ (1, 1), 0) = φ (φ (1, 1, 0), 0, 0)$

$φ (1, φ (1, 0)^{φ (1)}) = φ (φ (1, φ (1, 1)), 0) = φ (φ (1, φ (1, 1, 0), 0), 0, 0)$

$φ (1, φ (1, 1)) = φ (φ (2, 0), 0) = φ (φ (2, 0, 0), 0, 0)$

$φ (1, φ (1, φ (1))) = φ (φ (φ (1), 0), 0) = φ (φ (φ (1, 0), 0, 0), 0, 0)$

$φ (1, φ (1, φ (1, 0))) = φ (φ (φ (1, 0), 0), 0) = φ (φ (φ (1, 0, 0), 0, 0), 0, 0)$

$φ (2, 0) = φ (1, 0, 0) = φ (1, 0, 0, 0) =$ ζ0

$φ (1, φ (2, 0) + 1) = φ (φ (1, 0, 0), 0) = φ (φ (1, 0, 0, 0), 0, 0)$

$φ (1, φ (2, 0) + φ (1)) = φ (φ (1, 0, 0) + φ (1), 0) = φ (φ (1, 0, 0, φ (1, 0)), 0, 0)$

$φ (1, φ (2, 0) + φ (1, 0)) = φ (φ (1, 0, 0) + φ (1, 0), 0) = φ (φ (1, 0, 0, φ (1, 0, 0)), 0, 0)$

$φ (1, φ (2, 0) + φ (1, 0) \cdot φ (1)) = φ (φ (1, 0, 0) + φ (1, 1), 0) = φ (φ (1, 0, 0, φ (1, 1, 0)), 0, 0)$

$φ (1, φ (2, 0) + φ (1, 1)) = φ (φ (1, 0, 0) + φ (2, 0), 0) = φ (φ (1, 0, 0, φ (2, 0, 0)), 0, 0)$

$φ (1, φ (2, 0) + φ (1, φ (1, 0))) = φ (φ (1, 0, 0) + φ (φ (1, 0), 0), 0) = φ (φ (1, 0, 0, φ (φ (1, 0, 0), 0, 0)), 0, 0))$

$φ (1, φ (2, 0) \cdot 2) = φ (φ (1, 0, 0) \cdot 2, 0) = φ (φ (1, 0, 1, 0), 0, 0)$

$φ (1, φ (2, 0) \cdot φ (1)) = φ (φ (1, 1, 0), 0) = φ (φ (1, 0, φ (1, 0), 0), 0, 0)$

$φ (1, φ (2, 0)^{2}) = φ (φ (1, 0, φ (1, 0, 0)), 0) = φ (φ (1, 0, φ (1, 0, 0, 0), 0), 0, 0)$

$φ (1, φ (1, φ (2, 0) + 1)) = φ (φ (φ (1, 0, 0), 0), 0) = φ (φ (φ (1, 0, 0, 0), 0, 0), 0, 0)$

$φ (1, φ (1, φ (1, φ (2, 0) + 1))) = φ (φ (φ (φ (1, 0, 0), 0), 0), 0) = φ (φ (φ (φ (1, 0, 0, 0), 0, 0), 0, 0), 0, 0)$

$φ (2, 1) = φ (2, 0, 0) = φ (2, 0, 0, 0)$

$φ (1, φ (2, 1) + 1) = φ (φ (2, 0, 0), 0) = φ (φ (2, 0, 0, 0), 0, 0)$

$φ (1, φ (1, φ (2, 1) + 1)) = φ (φ (φ (2, 0, 0), 0), 0) = φ (φ (φ (2, 0, 0, 0), 0, 0), 0, 0)$

$φ (2, 2) = φ (3, 0, 0) = φ (3, 0, 0, 0)$

$φ (2, φ (1)) = φ (φ (1), 0, 0) = φ (φ (1, 0), 0, 0, 0)$

$φ (2, φ (1) \cdot 2) = φ (φ (1) \cdot 2, 0, 0) = φ (φ (1, φ (1, 0)), 0, 0, 0)$

$φ (2, φ (2)) = φ (φ (2), 0, 0) = φ (φ (2, 0), 0, 0, 0)$

$φ (2, φ (φ (1))) = φ (φ (φ (1)), 0, 0) = φ (φ (φ (1, 0), 0), 0, 0, 0)$

$φ (2, φ (1, 0)) = φ (φ (1, 0), 0, 0) = φ (φ (1, 0, 0), 0, 0, 0)$

$φ (2, φ (1, 1)) = φ (φ (2, 0), 0, 0) = φ (φ (2, 0, 0), 0, 0, 0)$

$φ (2, φ (1, φ (1))) = φ (φ (φ (1), 0), 0, 0) = φ (φ (φ (1, 0), 0, 0), 0, 0, 0)$

$φ (2, φ (2, 0)) = φ (φ (1, 0, 0), 0, 0) = φ (φ (1, 0, 0, 0), 0, 0, 0)$

$φ (2, φ (2, φ (2, 0))) = φ (φ (φ (1, 0, 0), 0, 0), 0, 0) = φ (φ (φ (1, 0, 0, 0), 0, 0, 0), 0, 0, 0)$

$φ (3, 0) = φ (1, 0, 0, 0) = φ (1, 0, 0, 0, 0) =$ η0

$φ (1, φ (3, 0) + 1) = φ (φ (1, 0, 0, 0), 0) = φ (φ (1, 0, 0, 0, 0), 0, 0)$

$φ (2, φ (3, 0) + 1) = φ (φ (1, 0, 0, 0), 0, 0) = φ (φ (1, 0, 0, 0, 0), 0, 0, 0)$

$φ (3, 1) = φ (2, 0, 0, 0) = φ (2, 0, 0, 0, 0)$

$φ (3, φ (1)) = φ (φ (1), 0, 0, 0) = φ (φ (1, 0), 0, 0, 0, 0)$

$φ (3, φ (φ (1))) = φ (φ (φ (1)), 0, 0, 0) = φ (φ (φ (1, 0), 0), 0, 0, 0, 0)$

$φ (3, φ (1, 0)) = φ (φ (1, 0), 0, 0, 0) = φ (φ (1, 0, 0), 0, 0, 0, 0)$

$φ (3, φ (2, 0)) = φ (φ (1, 0, 0), 0, 0, 0) = φ (φ (1, 0, 0, 0), 0, 0, 0, 0)$

$φ (3, φ (3, 0)) = φ (φ (1, 0, 0, 0), 0, 0, 0) = φ (φ (1, 0, 0, 0, 0), 0, 0, 0, 0)$

$φ (4, 0) = φ (1, 0, 0, 0, 0) = φ (1, 0, 0, 0, 0, 0)$

$φ (φ (1), 0) = φ (1$ @ $φ (1)) = φ (1$ @ $φ (1, 0)) =$ HCO

$φ (1, φ (φ (1), 0) + 1) = φ (φ (1$ @ $φ (1)), 0) = φ (φ (1$ @ $φ (1, 0)), 0, 0)$

$φ (2, φ (φ (1), 0) + 1) = φ (φ (1$ @ $φ (1)), 0, 0) = φ (φ (1$ @ $φ (1, 0)), 0, 0, 0)$

$φ (3, φ (φ (1), 0) + 1) = φ (φ (1$ @ $φ (1)), 0, 0, 0) = φ (φ (1$ @ $φ (1, 0)), 0, 0, 0, 0)$

$φ (φ (1), 1) = φ (2$ @ $φ (1)) = φ (2$ @ $φ (1, 0))$

$φ (1, φ (φ (1), 1) + 1) = φ (φ (2$ @ $φ (1)), 0) = φ (φ (2$ @ $φ (1, 0)), 0, 0)$

$φ (φ (1), 2) = φ (3$ @ $φ (1)) = φ (3$ @ $φ (1, 0))$

$φ (φ (1), φ (1)) = φ (φ (1)$ @ $φ (1)) = φ (φ (1, 0)$ @ $φ (1, 0))$

$φ (φ (1), φ (1) \cdot 2) = φ (φ (1) \cdot 2$ @ $φ (1)) = φ (φ (1, 0) \cdot 2$ @ $φ (1, 0))$

$φ (φ (1), φ (2)) = φ (φ (2)$ @ $φ (1)) = φ (φ (2, 0)$ @ $φ (1, 0))$

$φ (φ (1), φ (φ (1))) = φ (φ (φ (1))$ @ $φ (1)) = φ (φ (φ (1, 0), 0)$ @ $φ (1, 0))$

$φ (φ (1), φ (1, 0)) = φ (φ (1, 0)$ @ $φ (1)) = φ (φ (1, 0, 0)$ @ $φ (1, 0))$

$φ (φ (1), φ (2, 0)) = φ (φ (1, 0, 0)$ @ $φ (1)) = φ (φ (1, 0, 0, 0)$ @ $φ (1, 0))$

$φ (φ (1), φ (3, 0)) = φ (φ (1, 0, 0, 0)$ @ $φ (1)) = φ (φ (1, 0, 0, 0, 0)$ @ $φ (1, 0))$

$φ (φ (1), φ (φ (1), 0)) = φ (φ (1$ @ $φ (1))$ @ $φ (1)) = φ (φ (1$ @ $φ (1, 0))$ @ $φ (1, 0))$

$φ (φ (1) + 1, 0) = φ (1$ @ $φ (1) + 1) = φ (1$ @ $φ (1, 1))$

$φ (φ (1) + 1, φ (φ (1) + 1, 0)) = φ (φ (1$ @ $φ (1) + 1)$ @ $φ (1) + 1) = φ (φ (1$ @ $φ (1, 1))$ @ $φ (1, 1))$

$φ (φ (1) + 2, 0) = φ (1$ @ $φ (1) + 2) = φ (1$ @ $φ (1, 2))$

$φ (φ (1) \cdot 2, 0) = φ (1$ @ $φ (1) \cdot 2) = φ (1$ @ $φ (1, φ (1)))$

$φ (φ (1) \cdot 3, 0) = φ (1$ @ $φ (1) \cdot 3) = φ (1$ @ $φ (1, φ (1, φ (1, 0))))$

$φ (φ (2), 0) = φ (1$ @ $φ (2)) = φ (1$ @ $φ (2, 0))$

$φ (φ (φ (1)), 0) = φ (1$ @ $φ (φ (1))) = φ (1$ @ $φ (φ (1, 0), 0))$

$φ (φ (1, 0), 0) = φ (1$ @ $φ (1, 0)) = φ (1$ @ $φ (1, 0, 0))$

$φ (φ (2, 0), 0) = φ (1$ @ $φ (1, 0, 0)) = φ (1$ @ $φ (1, 0, 0, 0))$

$φ (φ (3, 0), 0) = φ (1$ @ $φ (1, 0, 0, 0)) = φ (1$ @ $φ (1, 0, 0, 0, 0))$

$φ (φ (φ (1), 0), 0) = φ (1$ @ $φ (1$ @ $φ (1))) = φ (1$ @ $φ (1$ @ $φ (1, 0)))$

$φ (φ (φ (1, 0), 0), 0) = φ (1$ @ $φ (1$ @ $φ (1, 0))) = φ (1$ @ $φ (1$ @ $φ (1, 0, 0)))$

$φ (φ (φ (2, 0), 0), 0) = φ (1$ @ $φ (1$ @ $φ (1, 0, 0))) = φ (1$ @ $φ (1$ @ $φ (1, 0, 0, 0)))$

$φ (1, 0, 0) = φ (1$ @ $(1, 0)) = φ (1$ @ $(1, 0)) =$ FSO

$φ (1, φ (1, 0, 0) + 1) = φ (φ (1$ @ $(1, 0)), 0) = φ (φ (1$ @ $(1, 0)), 0, 0)$

$φ (2, φ (1, 0, 0) + 1) = φ (φ (1$ @ $(1, 0)), 0, 0) = φ (φ (1$ @ $(1, 0)), 0, 0, 0)$

$φ (φ (1), φ (1, 0, 0) + 1) = φ (φ (1$ @ $(1, 0))$ @ $φ (1)) = φ (φ (1$ @ $(1, 0))$ @ $φ (1, 0))$

$φ (φ (1, 0), φ (1, 0, 0) + 1) = φ (φ (1$ @ $(1, 0))$ @ $φ (1, 0)) = φ (φ (1$ @ $(1, 0))$ @ $φ (1, 0, 0))$

$φ (φ (2, 0), φ (1, 0, 0) + 1) = φ (φ (1$ @ $(1, 0))$ @ $φ (1, 0, 0)) = φ (φ (1$ @ $(1, 0))$ @ $φ (1, 0, 0, 0))$

$φ (φ (1, 0, 0), 1) = φ (2$ @ $φ (1$ @ $(1, 0))) = φ (2$ @ $φ (1$ @ $(1, 0)))$

$φ (φ (1, 0, 0), 2) = φ (3$ @ $φ (1$ @ $(1, 0))) = φ (3$ @ $φ (1$ @ $(1, 0)))$

$φ (φ (1, 0, 0), φ (1)) = φ (φ (1)$ @ $φ (1$ @ $(1, 0))) = φ (φ (1, 0)$ @ $φ (1$ @ $(1, 0)))$

$φ (φ (1, 0, 0), φ (1, 0)) = φ (φ (1, 0)$ @ $φ (1$ @ $(1, 0))) = φ (φ (1, 0, 0)$ @ $φ (1$ @ $(1, 0)))$

$φ (φ (1, 0, 0), φ (1, 0, 0)) = φ (φ (1$ @ $(1, 0))$ @ $φ (1$ @ $(1, 0))) = φ (φ (1$ @ $(1, 0))$ @ $φ (1$ @ $(1, 0)))$

$φ (φ (1, 0, 0) + 1, 0) = φ (1$ @ $φ (1$ @ $(1, 0)) + 1) = φ (1$ @ $φ (1$ @ $(1, 0), 1$ @ $0))$

$φ (φ (1, 0, 0) + φ (1), 0) = φ (1$ @ $φ (1$ @ $(1, 0)) + φ (1)) = φ (1$ @ $φ (1$ @ $(1, 0), φ (1, 0)$ @ $0))$

$φ (φ (1, 0, 0) + φ (1, 0), 0) = φ (1$ @ $φ (1$ @ $(1, 0)) + φ (1, 0)) = φ (1$ @ $φ (1$ @ $(1, 0), φ (1, 0, 0)$ @ $0))$

$φ (φ (1, 0, 0) \cdot 2, 0) = φ (1$ @ $φ (1$ @ $(1, 0)) \cdot 2) = φ (1$ @ $φ (1$ @ $(1, 0), φ (1$ @ $(1, 0))$ @ $0))$

$φ (φ (1, 0, 0) \cdot φ (1), 0) = φ (1$ @ $φ (1$ @ $(1, 0), 1$ @ $0)) = φ (1$ @ $φ (1$ @ $(1, 0), 1$ @ $1))$

$φ (φ (1, 0, 0)^{2}, 0) = φ (1$ @ $φ (1$ @ $(1, 0), φ (1$ @ $(1, 0))$ @ $0)) = φ (1$ @ $φ (1$ @ $(1, 0), φ (1$ @ $(1, 0))$ @ $0))$

$φ (φ (1, 0, 0)^{φ (1)}, 0) = φ (1$ @ $φ (1, φ (1$ @ $(1, 0), 1$ @ $0), 0)) = φ (1$ @ $φ (1, φ (1$ @ $(1, 0), 1$ @ $1), 0))$

$φ (φ (1, 0, 0)^{φ (1, 0)}, 0) = φ (1$ @ $φ (1$ @ $(1, 0), φ (1$ @ $(1, 0), φ (1, 0)$ @ $0)$ @ $0)) = φ (1$ @ $φ (1$ @ $(1, 0), φ (1$ @ $(1, 0), φ (1, 0)$ @ $0)$ @ $0))$

$φ (φ (1, 0, 0)^{φ (1, 0, 0)}, 0) = φ (1$ @ $φ (1$ @ $(1, 0), φ (1$ @ $(1, 0), φ (1$ @ $(1, 0))$ @ $0)$ @ $0)) = φ (1$ @ $φ (1$ @ $(1, 0), φ (1$ @ $(1, 0), φ (1$ @ $(1, 0))$ @ $0)$ @ $0))$

$φ (φ (1, φ (1, 0, 0) + 1), 0) = φ (1$ @ $φ (φ (1$ @ $(1, 0)), 0)) = φ (1$ @ $φ (φ (1$ @ $(1, 0)), 0, 0))$

$φ (φ (1, φ (1, 0, 0) + φ (1)), 0) = φ (1$ @ $φ (φ (1$ @ $(1, 0)) + φ (1), 0)) = φ (1$ @ $φ (φ (1$ @ $(1, 0)) + φ (1, 0), 0))$

$φ (φ (φ (1), φ (1, 0, 0) + 1), 0) = φ (1$ @ $φ (φ (1$ @ $(1, 0))$ @ $φ (1))) = φ (1$ @ $φ (φ (1$ @ $(1, 0))$ @ $φ (1, 0)))$

$φ (1, 0, 1) = φ (1$ @ $(1, 1)) = φ (1$ @ $(1, 1))$

$φ (1, 0, 2) = φ (2$ @ $(1, 1)) = φ (2$ @ $(1, 1))$

$φ (1, 0, φ (1)) = φ (φ (1)$ @ $(1, 1)) = φ (φ (1, 0)$ @ $(1, 1))$

$φ (1, 0, φ (1, 0)) = φ (φ (1, 0)$ @ $(1, 1)) = φ (φ (1, 0, 0)$ @ $(1, 1))$

$φ (1, 0, φ (1, 0, 0)) = φ (φ (1$ @ $(1, 0))$ @ $(1, 1)) = φ (φ (1$ @ $(1, 0))$ @ $(1, 1))$

$φ (1, 1, 0) = φ (1$ @ $(1, 1)) = φ (1$ @ $(1, 1))$

$φ (1, 1, φ (1, 1, 0)) = φ (φ (1$ @ $(1, 1))$ @ $(1, 1)) = φ (φ (1$ @ $(1, 1))$ @ $(1, 1))$

$φ (1, 2, 0) = φ (1$ @ $(1, 2)) = φ (1$ @ $(1, 2))$

$φ (1, φ (1), 0) = φ (1$ @ $(1, φ (1))) = φ (1$ @ $(1, φ (1, 0)))$

$φ (1, φ (1, 0), 0) = φ (1$ @ $(1, φ (1, 0))) = φ (1$ @ $(1, φ (1, 0, 0)))$

$φ (1, φ (1, 0, 0), 0) = φ (1$ @ $(1, φ (1$ @ $(1, 0)))) = φ (1$ @ $(1, φ (1$ @ $(1, 0))))$

$φ (2, 0, 0) = φ (1$ @ $(2, 0)) = φ (1$ @ $(2, 0))$

$φ (2, 0, 1) = φ (2$ @ $(2, 0)) = φ (2$ @ $(2, 0))$

$φ (2, 1, 0) = φ (1$ @ $(2, 1)) = φ (1$ @ $(2, 1))$

$φ (2, φ (2, 0, 0), 0) = φ (1$ @ $(2, φ (1$ @ $(2, 0)))) = φ (1$ @ $(2, φ (1$ @ $(2, 0))))$

$φ (3, 0, 0) = φ (1$ @ $(3, 0)) = φ (1$ @ $(3, 0))$

$φ (φ (1), 0, 0) = φ (1$ @ $(φ (1), 0)) = φ (1$ @ $(φ (1, 0), 0))$

$φ (φ (1, 0), 0, 0) = φ (1$ @ $(φ (1, 0), 0)) = φ (1$ @ $(φ (1, 0, 0), 0))$

$φ (φ (1, 0, 0), 0, 0) = φ (1$ @ $(φ (1$ @ $(1, 0)), 0)) = φ (1$ @ $(φ (1$ @ $(1, 0)), 0))$

$φ (1, 0, 0, 0) = φ (1$ @ $(1, 0, 0)) = φ (1$ @ $(1, 0, 0)) =$ ACO

$φ (1, 0, 0, 1) = φ (2$ @ $(1, 0, 0)) = φ (2$ @ $(1, 0, 0))$

$φ (1, 0, 1, 0) = φ (1$ @ $(1, 0, 1)) = φ (1$ @ $(1, 0, 1))$

$φ (1, 1, 0, 0) = φ (1$ @ $(1, 1, 0)) = φ (1$ @ $(1, 1, 0))$

$φ (2, 0, 0, 0) = φ (1$ @ $(2, 0, 0)) = φ (1$ @ $(2, 0, 0))$

$φ (φ (1), 0, 0, 0) = φ (1$ @ $(φ (1), 0, 0)) = φ (1$ @ $(φ (1, 0), 0, 0))$

$φ (φ (1, 0, 0, 0), 0, 0, 0) = φ (1$ @ $(φ (1$ @ $(1, 0, 0)), 0, 0)) = φ (1$ @ $(φ (1$ @ $(1, 0, 0)), 0, 0))$

$φ (1, 0, 0, 0, 0) = φ (1$ @ $(1, 0, 0, 0)) = φ (1$ @ $(1, 0, 0, 0))$

$φ (1, 0, 0, 0, 0, 0) = φ (1$ @ $(1, 0, 0, 0, 0)) = φ (1$ @ $(1, 0, 0, 0, 0))$

$φ (1, 1, 4, 5, 1, 4) = φ (5$ @ $(1, 1, 4, 5, 1)) = φ (5$ @ $(1, 1, 4, 5, 1))$

$φ (1$ @ $φ (1)) = φ (1$ @ $(1$ @ $φ (1))) = φ (1$ @ $(1$ @ $φ (1, 0))) =$ SVO

$φ (1, φ (1$ @ $φ (1)) + 1) = φ (1$ @ $(1$ @ $φ (1)), 1$ @ $1) = φ (1$ @ $(1$ @ $φ (1, 0)), 1$ @ $2)$

$φ (1$ @ $φ (1), 1$ @ $0) = φ (2$ @ $(1$ @ $φ (1))) = φ (2$ @ $(1$ @ $φ (1, 0)))$

$φ (1$ @ $φ (1), 1$ @ $1) = φ (1$ @ $(1$ @ $φ (1), 1$ @ $0)) = φ (1$ @ $(1$ @ $φ (1, 0), 1$ @ $0))$

$φ (1$ @ $φ (1), 1$ @ $2) = φ (1$ @ $(1$ @ $φ (1), 1$ @ $1)) = φ (1$ @ $(1$ @ $φ (1, 0), 1$ @ $1))$

$φ (2$ @ $φ (1)) = φ (1$ @ $(2$ @ $φ (1))) = φ (1$ @ $(2$ @ $φ (1, 0)))$

$φ (φ (1)$ @ $φ (1)) = φ (1$ @ $(φ (1)$ @ $φ (1))) = φ (1$ @ $(φ (1, 0)$ @ $φ (1, 0)))$

$φ (1$ @ $φ (1) + 1) = φ (1$ @ $(1$ @ $φ (1) + 1)) = φ (1$ @ $(1$ @ $φ (1, 1)))$

$φ (1$ @ $φ (1) \cdot 2) = φ (1$ @ $(1$ @ $φ (1) \cdot 2)) = φ (1$ @ $(1$ @ $φ (1, φ (1, 0))))$

$φ (1$ @ $φ (2)) = φ (1$ @ $(1$ @ $φ (2))) = φ (1$ @ $(1$ @ $φ (2, 0)))$

$φ (1$ @ $φ (1, 0)) = φ (1$ @ $(1$ @ $φ (1, 0))) = φ (1$ @ $(1$ @ $φ (1, 0, 0)))$

$φ (1$ @ $φ (2, 0)) = φ (1$ @ $(1$ @ $φ (1, 0, 0))) = φ (1$ @ $(1$ @ $φ (1, 0, 0, 0)))$

$φ (1$ @ $φ (1, 0, 0)) = φ (1$ @ $(1$ @ $φ (1$ @ $(1, 0)))) = φ (1$ @ $(1$ @ $φ (1$ @ $(1, 0))))$

$φ (1$ @ $φ (1$ @ $φ (1))) = φ (1$ @ $(1$ @ $φ (1$ @ $(1$ @ $φ (1))))) = φ (1$ @ $(1$ @ $φ (1$ @ $(1$ @ $φ (1, 0))))) =$ LVO

历史

据信在 2024 年下旬及以前的 Weak Veblen 都是指的 $\times ω φ$ ，但在这之后 $\times ω φ$ 的生态位快速被 $+ 1 φ$ 所代替了，所以出现了一些较为混乱的局面。