>>454
それよか、おっさんよ
おまえさん、いつになったら PROMENADE IN IUT読めるようになるの?
早くて、百年後かな?

PROMENADE IN IUTから、”elliptic curve”の箇所を抜粋すると、ほんの最初の導入部分だけでも、下記だよ

(参考)
http://www.kurims.kyoto-u.ac.jp/~bcollas/IUT/documents/RIMS-Lille%20-%20Promenade%20in%20Inter-Universal%20Teichm%C3%BCller%20Theory.pdf
Research Institute for Mathematical Sciences - Kyoto University, Japan
PROMENADE IN INTER-UNIVERSAL TEICHMULLER THEORY - 復元
Online Seminar - Algebraic & Arithmetic Geometry
Laboratoire Paul Painleve - Universite de Lille, France
Version 1 ? ε - 09/10/2020

P1
INTRODUCTION

The seminal achievement of Mochizuki’s IUT is to provide a new geometry that brings an estimate of
the (abc) rigidity property within reach. IUT theory is a geometry of the moduli stack of elliptic curves
M1,1 whose k-points are endowed with certain rigid Diophantine arithmetic line bundle invariants
with place-wise compatible arithmetic and geometric symmetries, and that are embedded in various
types of non-rigid anabelian etale containers.

つづく