泛域间的teichmller理论IV:对数体积计算和集合论基础

IF 1.1 2区 数学 Q1 MATHEMATICS
S. Mochizuki
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引用次数: 30

摘要

本论文是关于“宇宙间的teichm勒理论”系列论文的第四篇也是最后一篇。在本系列的前三篇论文中,我们介绍并研究了围绕logtheta-lattice的理论,这是一种高度非交换的二维图,称为Θ±ellNF-Hodge剧院,在本系列的第一篇论文中,它与某些称为初始Θ-data的数据相关联。该数据包括一个数域F上的椭圆曲线EF,以及一个素数l≥5。考虑到log-theta-lattice的各种性质,在本系列的第三篇论文中自然建立了构造“LGP-monoids的分裂monoids”的多径向算法。这里,我们回顾一下,“多径向算法”是从“异形算法全纯结构”的角度来看有意义的算法,即Θ±ellNF-Hodge剧院的环/图式结构与给定的Θ±ellNF-Hodge剧院通过对数晶格的非环/图式理论水平箭头相关联。在本文中,利用这些分割LGP-monoids的多径向算法所产生的估计来验证各种丢梵图结果,这些结果包含了所谓的双曲曲线的Vojta猜想,椭圆曲线的ABC猜想和Szpiro猜想。最后,我们检查-尽管从一个非常幼稚/非专业的观点!-通过引入和研究“物种”概念的基本性质,围绕log-theta-lattice的垂直和水平箭头的基础/集合论问题,“物种”概念可以被认为是一种形式化,通过集合论公式,直观的“数学对象类型”概念。这些基础问题与本系列论文中所扮演的核心角色密切相关,这些核心角色是由绝对无abel几何的各种结果所引起的,也与将传统方案理论的不同模型粘合在一起的想法密切相关,即,以一种位于传统方案理论框架之外的方式。此外,正是这些围绕着对数晶格的垂直和水平箭头的基本问题,自然导致了“互泛”一词的引入。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Inter-universal Teichmüller Theory IV: Log-Volume Computations and Set-Theoretic Foundations
The present paper forms the fourth and final paper in a series of papers concerning “inter-universal Teichmüller theory”. In the first three papers of the series, we introduced and studied the theory surrounding the logtheta-lattice, a highly non-commutative two-dimensional diagram of “miniature models of conventional scheme theory”, called Θ±ellNF-Hodge theaters, that were associated, in the first paper of the series, to certain data, called initial Θ-data. This data includes an elliptic curve EF over a number field F , together with a prime number l ≥ 5. Consideration of various properties of the log-theta-lattice led naturally to the establishment, in the third paper of the series, of multiradial algorithms for constructing “splitting monoids of LGP-monoids”. Here, we recall that “multiradial algorithms” are algorithms that make sense from the point of view of an “alien arithmetic holomorphic structure”, i.e., the ring/scheme structure of a Θ±ellNF-Hodge theater related to a given Θ±ellNF-Hodge theater by means of a non-ring/scheme-theoretic horizontal arrow of the log-theta-lattice. In the present paper, estimates arising from these multiradial algorithms for splitting monoids of LGP-monoids are applied to verify various diophantine results which imply, for instance, the so-called Vojta Conjecture for hyperbolic curves, the ABC Conjecture, and the Szpiro Conjecture for elliptic curves. Finally, we examine — albeit from an extremely naive/non-expert point of view! — the foundational/settheoretic issues surrounding the vertical and horizontal arrows of the log-theta-lattice by introducing and studying the basic properties of the notion of a “species”, which may be thought of as a sort of formalization, via set-theoretic formulas, of the intuitive notion of a “type of mathematical object”. These foundational issues are closely related to the central role played in the present series of papers by various results from absolute anabelian geometry, as well as to the idea of gluing together distinct models of conventional scheme theory, i.e., in a fashion that lies outside the framework of conventional scheme theory. Moreover, it is precisely these foundational issues surrounding the vertical and horizontal arrows of the log-theta-lattice that led naturally to the introduction of the term “inter-universal”.
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来源期刊
CiteScore
1.90
自引率
0.00%
发文量
26
审稿时长
>12 weeks
期刊介绍: The aim of the Publications of the Research Institute for Mathematical Sciences (PRIMS) is to publish original research papers in the mathematical sciences.
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