缓成长阶层

在可计算性理论、计算复杂性理论和证明理论中，缓成长阶层是缓成长函数g_α: N → N的序数索引族（其中N是自然数集合, {0, 1, ... }）。缓成长阶层的增长率与急成长阶层形成鲜明对比。

定义

令 μ 为一个大的可数序数，以便将基本序列分配给每个小于 μ 的极限序数。函数g_α: N → N的缓成长阶层（对于α<μ）定义如下：^[1]

$g_{0}(n)=0$
$g_{\alpha +1}(n)=g_{\alpha }(n)+1$
对于极限序数α， $g_{\alpha }(n)=g_{\alpha [n]}(n)$ 。

这里， α[n] 表示分配给极限序数 α 的基本序列的第n个元素。

关于急成长阶层的文章描述了所有 α<ε₀ 的基本序列的标准化选择。

例

$g_{1}(n)=1$
$g_{m}(n)=m$
$g_{\omega }(n)=n$
$g_{\omega +m}(n)=n+m$
$g_{\omega m}(n)=mn$
$g_{\omega ^{m}}(n)=n^{m}$
$g_{\omega ^{\omega }}(n)=n^{n}$
$g_{\varepsilon _{0}}(n)=n\uparrow \uparrow n$

与急成长阶层的关系

对于较小的索引，缓成长阶层比急成长阶层增长得慢得多。即使g_ε₀也只相当于f₃，并且当α达到巴赫曼-霍华德序数时，g_α也只能达到f_ε₀的增长率。皮亚诺算术无法证明偏函数结构中的第一个函数。 ^[2] ^[3] ^[4]

然而与之形成鲜明对比的是，吉拉德证明，缓成长阶层最终会赶上急成长阶层。^[2]具体来说，存在一个序数α使得对于所有整数n

g_α(n)<f_α(n)<g_α(n+1)

其中f_α是急成长阶层中的函数。他进一步表明，第一个使之成立的α，是归纳定义的任意有限迭代的理论ID_<ω的序数。^[5]然而，对于^[3]中发现的基本序列的分配，第一次匹配发生在ε₀级别。^[6]对于Buchholz风格的树序数，可以证明第一次匹配甚至发生在 $\omega ^{2}$ 。

将证明^[5]的结果扩展到相当大的序数表明，低于超限迭代序数的序数非常少 $\Pi _{1}^{1}$ -理解缓成长阶层和急成长阶层相匹配的情况。 ^[7]

缓成长阶层极其敏感地依赖于底层基本序列的选择。 ^[6] ^[8] ^[9]

参考

Gallier, Jean H. What's so special about Kruskal's theorem and the ordinal Γ₀? A survey of some results in proof theory. Ann. Pure Appl. Logic. 1991, 53 (3): 199–260. MR 1129778. doi:10.1016/0168-0072(91)90022-E. ^{[失效連結]} PDF's: part 1 2 3. (In particular part 3, Section 12, pp. 59–64, "A Glimpse at Hierarchies of Fast and Slow Growing Functions".)

笔记

^ J. Gallier, What's so special about Kruskal's theorem and the ordinal Γ₀? A survey of some results in proof theory (2012, p.63). Accessed 8 May 2023.
^ ^2.0 ^2.1 Girard, Jean-Yves. Π¹₂-logic. I. Dilators. Annals of Mathematical Logic. 1981, 21 (2): 75–219. ISSN 0003-4843. MR 0656793. doi:10.1016/0003-4843(81)90016-4  .
^ ^3.0 ^3.1 Cichon. P. Aczel , 编. Termination Proofs and Complexity Characterisations. Cambridge University Press. 1992: 173–193.
^ Cichon, E. A.; Wainer, S. S. The slow-growing and the Grzegorczyk hierarchies. The Journal of Symbolic Logic. 1983, 48 (2): 399–408. ISSN 0022-4812. JSTOR 2273557. MR 0704094. S2CID 1390729. doi:10.2307/2273557.
^ ^5.0 ^5.1 Wainer, S. S. Slow Growing Versus Fast Growing. The Journal of Symbolic Logic. 1989, 54 (2): 608–614. JSTOR 2274873. S2CID 19848720. doi:10.2307/2274873.
^ ^6.0 ^6.1 Weiermann, A. Sometimes slow growing is fast growing. Annals of Pure and Applied Logic. 1997, 90 (1–3): 91–99. doi:10.1016/S0168-0072(97)00033-X  .
^ Weiermann, A. Investigations on slow versus fast growing: How to majorize slow growing functions nontrivially by fast growing ones. Archive for Mathematical Logic. 1995, 34 (5): 313–330. S2CID 34180265. doi:10.1007/BF01387511.
^ Cooper, S. Barry; Truss, John K. Sets and Proofs. Cambridge University Press https://books.google.com/books?id=2IHm3RT2bBoC&pg=PA403. 1999-06-17. ISBN 978-0-521-63549-3 （英语）. 缺少或|title=为空 (帮助)
^ Weiermann, Andreas. Γ₀ May be Minimal Subrecursively Inaccessible. Mathematical Logic Quarterly. 2001, 47 (3): 397–408. doi:10.1002/1521-3870(200108)47:3<397::AID-MALQ397>3.0.CO;2-Y.

[1] J. Gallier, What's so special about Kruskal's theorem and the ordinal Γ₀? A survey of some results in proof theory (2012, p.63). Accessed 8 May 2023.

[girard81-2] 2.0 ^2.1 Girard, Jean-Yves. Π¹₂-logic. I. Dilators. Annals of Mathematical Logic. 1981, 21 (2): 75–219. ISSN 0003-4843. MR 0656793. doi:10.1016/0003-4843(81)90016-4  .

[cichon-3] 3.0 ^3.1 Cichon. P. Aczel , 编. Termination Proofs and Complexity Characterisations. Cambridge University Press. 1992: 173–193.

[wainer83-4] Cichon, E. A.; Wainer, S. S. The slow-growing and the Grzegorczyk hierarchies. The Journal of Symbolic Logic. 1983, 48 (2): 399–408. ISSN 0022-4812. JSTOR 2273557. MR 0704094. S2CID 1390729. doi:10.2307/2273557.

[wainer89-5] 5.0 ^5.1 Wainer, S. S. Slow Growing Versus Fast Growing. The Journal of Symbolic Logic. 1989, 54 (2): 608–614. JSTOR 2274873. S2CID 19848720. doi:10.2307/2274873.

[weier1997-6] 6.0 ^6.1 Weiermann, A. Sometimes slow growing is fast growing. Annals of Pure and Applied Logic. 1997, 90 (1–3): 91–99. doi:10.1016/S0168-0072(97)00033-X  .

[weier1995-7] Weiermann, A. Investigations on slow versus fast growing: How to majorize slow growing functions nontrivially by fast growing ones. Archive for Mathematical Logic. 1995, 34 (5): 313–330. S2CID 34180265. doi:10.1007/BF01387511.

[weier1999-8] Cooper, S. Barry; Truss, John K. Sets and Proofs. Cambridge University Press https://books.google.com/books?id=2IHm3RT2bBoC&pg=PA403. 1999-06-17. ISBN 978-0-521-63549-3 （英语）. 缺少或|title=为空 (帮助)

[weier2001-9] Weiermann, Andreas. Γ₀ May be Minimal Subrecursively Inaccessible. Mathematical Logic Quarterly. 2001, 47 (3): 397–408. doi:10.1002/1521-3870(200108)47:3<397::AID-MALQ397>3.0.CO;2-Y.

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