Bridging Computational Notions of Depth: Here's Why Strong Depth is Negligible
Table of LinksAbstract and 1 Introduction2 Background3 On the slow growth law4 Members of Deep Π 2025-1-17 02:48:0 Author: hackernoon.com(查看原文) 阅读量:20 收藏
Table of LinksAbstract and 1 Introduction2 Background3 On the slow growth law4 Members of Deep Π 2025-1-17 02:48:0 Author: hackernoon.com(查看原文) 阅读量:20 收藏
Table of Links
4 Members of Deep Π0 1 classes
5. Strong Depth is Negligible
Theorem 25. The class of strongly deep sequences is negligible.
Proof. For the sake of contradiction, assume there exists a functional Φ such that
It is clear that q is computable. Moveover, q is a discrete semimeasure, since
On the other hand, for almost all n:
Note, by contrast, that the collection of weakly deep sequences is not negligible. Indeed, as shown by Muchnik et al. [MSU98], no 1-generic sequence is Martin-L¨of random with respect to a computable measure, and thus every 1-generic is weakly deep. Moreover, as shown by Kautz [Kau91], every 2-random sequence computes a 1-generic, and hence the collection of 1-generics is not negligible.
Authors:
(1) Laurent Bienvenu;
(2) Christopher P. Porter.
文章来源: https://hackernoon.com/bridging-computational-notions-of-depth-heres-why-strong-depth-is-negligible?source=rss
如有侵权请联系:admin#unsafe.sh
如有侵权请联系:admin#unsafe.sh