Hostname: page-component-857557d7f7-nfgnx Total loading time: 0.001 Render date: 2025-12-10T04:24:50.603Z Has data issue: false hasContentIssue false
  • English
  • Français

RELATIVE LEFTMOST PATH PRINCIPLES AND OMEGA-MODEL REFLECTIONS OF TRANSFINITE INDUCTIONS

Part of: Computability and recursion theory Proof theory and constructive mathematics General logic

Published online by Cambridge University Press:  09 June 2025

YUDAI SUZUKI Open the ORCID record for YUDAI SUZUKI [Opens in a new window]
YUDAI SUZUKI*
Affiliation:
NATIONAL INSTITUTE OF TECHNOLOGY OYAMA JAPAN
*
E-mail: yudai.suzuki.research@gmail.com
Get access Rights & Permissions [Opens in a new window]

Abstract

In this article, we give characterizations of Towsner’s relative leftmost path principles in terms of omega-model reflections of transfinite inductions. In particular, we show that the omega-model reflection of $\Pi ^1_{n+1}$ transfinite induction is equivalent to the $\Sigma ^0_n$ relative leftmost path principle over $\mathsf {RCA}_0$ for $n> 1$. As a consequence, we have that $\Sigma ^0_{n+1}\mathsf {LPP}$ is strictly stronger than $\Sigma ^0_{n}\mathsf {LPP}$.

Keywords

reverse mathematicssecond-order arithmeticrelative leftmost path principleomega-model reflectionWeihrauch degrees

MSC classification

Primary: 03B30: Foundations of classical theories (including reverse mathematics) 03D30: Other degrees and reducibilities 03D55: Hierarchies 03F35: Second- and higher-order arithmetic and fragments

Information

Type
Article
Information
The Journal of Symbolic Logic , First View , pp. 1 - 15
Check for updates
Copyright
© The Author(s), 2025. Published by Cambridge University Press on behalf of The Association for Symbolic Logic

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

Article purchase

Temporarily unavailable

References

REFERENCES

Freund, A., Fraïssé’s conjecture, partial impredicativity and well-ordering principles, part I. Proceedings of the American Mathematical Society, vol. 153 (2025), no. 3, pp. 937946.Google Scholar
Jäger, G. and Strahm, T., Bar induction and $\omega$ model reflection . Annals of Pure and Applied Logic, vol. 97 (1999), nos. 1–3, pp. 221230.Google Scholar
Montalbán, A., Indecomposable linear orderings and hyperarithmetic analysis . Journal of Mathematical Logic, vol. 6 (2006), no. 1, pp. 89120.Google Scholar
Probst, D., A modular ordinal analysis of metapredicative subsystems of second order arithmetic. PhD thesis, Institute of Computer Science, 2017.Google Scholar
Simpson, S. G., Subsystems of Second Order Arithmetic, second ed., Perspectives in Logic, Cambridge University Press, Cambridge; Association for Symbolic Logic, Poughkeepsie, 2009.Google Scholar
Suzuki, Y. and Yokoyama, K., On the ${\varPi}_2^1$ consequences of ${\varPi}_1^1-{\mathsf{CA}}_0$ . Journal of Mathematical Logic, (2025), Accepted for publication.Google Scholar
Suzuki, Y. and Yokoyama, K., Searching problems above arithmetical transfinite recursion . Annals of Pure and Applied Logic, vol. 175 (2024), no. 10, p. 103488.Google Scholar
Towsner, H., Partial impredicativity in reverse mathematics . The Journal of Symbolic Logic, vol. 78 (2013), no. 2, pp. 459488.Google Scholar