>>753
>Promenade in IUT いままで4回 11/5分まで終了

なお、下記ですね

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 - 10/05/2020
(抜粋)
TALK 1.2 - ABC & VOJTA CONJECTURES: HEIGHTS AND RAMIFICATION. Vojta Conjecture in its
“generalized” form [Voj98] introduces further elements of arithmetic-geometry in terms of divisors,
curves, and number fields. The Diophantine ingredient is here given by Weil’s notion of height, see
[BG06] §2.4. As a result, one obtains a first connection with abc and the coarse moduli scheme M1,1 of
one-pointed elliptic curves endowed with D = (0) + (1) + (∞).
The Vojta conjecture with ramification for curves - see ibid. Conj 14.4.13 & 14.4.10 - is the equivalent
form of abc (Strg.) in its number field version as formulated in Conj. 14.4.12.
Vojta Conjecture (Curve NF.) For all curves C over any number field K, considering
S ≦ MK a finite set of places on K, D a reduced effective divisor and H a ample line bundle
on C, let ε > 0, then
mS,D(P) + hKC
(P) ≦ d(P) + εhH(P) + ο(K(P):K](1)
holds for every P ∈ C \ supp(D).
Here, mS,D denotes the proximity function of local heights with respect to D and S of §14.3.1, and h_●
denotes the height function with respect to a line bundle.

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