Explicit estimates in inter-universal Teichmüller theory

Mochizuki, Shinichi; Fesenko, Ivan; Hoshi, Yuichiro; Minamide, Arata; Porowski, Wojciech

doi:10.2996/kmj45201

Cited by 3 publications

(2 citation statements)

References 19 publications

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“…-It is worth noting the significant attention that Szpiro's conjecture has received since the 2012 release of Shinichi Mochizuki's four preprints claiming a proof via inter-universal Teichmüller theory. These four papers have since been published [44,45,46,47] with an additional follow-up article [49], although the academic disagreements have not yet been completely resolved to the author's knowledge (c.f. [9,13,32,48,58]).…”

Section: Publications Mathématiques De Besançon -2024mentioning

confidence: 99%

The abcd conjecture, uniform boundedness, and dynamical systems

Zhang

2024

Publications Mathématiques De Besançon. Algèbre Et Théorie Des Nombres

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We survey Vojta's higher-dimensional generalizations of the abc conjecture and Szpiro's conjecture as well as recent developments that apply them to various problems in arithmetic dynamics. In particular, the "abcd conjecture" implies a dynamical analogue of a conjecture on the uniform boundedness of torsion points and a dynamical analogue of Lang's conjecture on lower bounds for canonical heights.Résumé. -Nous décrivons des généralisations en dimension supérieure dues à Vojta de la conjecture abc et de la conjecture de Szpiro, ainsi que des avancées récentes qui les utilisent dans des problèmes variés de dynamique arithmétique. En particulier, la « conjecture abcd » implique un analogue dynamique de la conjecture de torsion et un analogue dynamique de la conjecture de Lang sur les minorations de hauteurs canoniques.

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Section: Publications Mathématiques De Besançon -2024mentioning

confidence: 99%

The abcd conjecture, uniform boundedness, and dynamical systems

Zhang

2024

Publications Mathématiques De Besançon. Algèbre Et Théorie Des Nombres

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“…In particular, Mochizuki's log-Kummer Indeterminacy Ind3 emerges quite naturally from my point of view (Theorem 10.15.1). As Mochizuki reminds us in [Mochizuki, 2022], Indetermincay Ind3 is central to his proof of [Mochizuki, 2021c, Corollary 3.12]. § 10.2 Let X/E be a geometrically connected, smooth, quasi-projective variety over a p- p n .…”

Section: Then One Hasmentioning

confidence: 99%

Construction of Arithmetic Teichmuller spaces II: Proof of a local prototype of Mochizuki's Corollary 3.12

Joshi¹

2023

Preprint

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This paper deals with consequences of the existence of Arithmetic Teichmuller spaces established here and here. Theorem 9.2.1 provides a proof of a local version of Mochizuki's Corollary 3.12. Local means for a fixed p-adic field. There are several new innovations in this paper. Some of the main results are as follows. Theorem 3.5.1 shows that one can view the Tate parameter of Tate elliptic curve as a function on the arithmetic Teichmuller space of [Joshi, 2021a], [Joshi, 2022]. The next important point is the construction of Mochizuki's Θ gau -links and the set of such links, called Mochizuki's Ansatz in § 6. Theorem 6.9.1 establishes valuation scaling property satisfied by points of Mochizuki's Ansatz (i.e. by my version of Θ gau -links). These results lead to the construction of a thetavalues set ( § 8) which is similar to Mochizuki's Theta-values set (differences between the two are in § 8.7.1). Finally Theorem 9.2.1 is established. For completeness, I provide an intrinsic proof of the existence of Mochizuki's log-links (Theorem 10.9.1), log-links (Theorem 10.15.1) and Mochizuki's log-Kummer Indeterminacy (Theorem 10.20.1) in my theory.

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Deep Disagreement in Mathematics

Aberdein¹

2023

glob. Philosophy

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Explicit estimates in inter-universal Teichmüller theory

Cited by 3 publications

References 19 publications

The abcd conjecture, uniform boundedness, and dynamical systems

The abcd conjecture, uniform boundedness, and dynamical systems

Construction of Arithmetic Teichmuller spaces II: Proof of a local prototype of Mochizuki's Corollary 3.12

Deep Disagreement in Mathematics

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