(参考) https://www.uvm.edu/~tdupuy/papers.html [ Taylor Dupuy's Homepage] tdupuy at uvm dot edu [ manuscripts ]
1.The Statement of Mochizuki's Corollary 3.12, preprint available on request, (with A. Hilado) 2.Probabilistic Szpiro, Baby Szpiro, and Explicit Szpiro from Mochizuki's Corollary 3.12, preprint available on request, (with A. Hilado)
あと>>393より Fall 2019, University of Arizona How to work with Mochizuki's Inequality Spring 2019, University of Tennesse Knoxville, Barrett Lectures A User's Guide to Mochizuki's Inequality Spring 2019, Rice, AGNT Seminar Explicit Computations in IUT Fall 2018, unQVNTS (Three Talks) Mochizuki's Inequalities 0400132人目の素数さん2020/03/21(土) 20:39:07.97ID:hVYoyaNb RIMS 訪問滞在型研究 宇宙際タイヒミュラー理論の拡がり
台密 東密 望密 0431132人目の素数さん2020/03/23(月) 21:02:51.50ID:8hlHRLPg モッチ「3.12の証明? ホシちゃん、君はまだ PDF NEW !! (2020-03-22) を見ていないようだね」 ホシ「モッチ先生、まだ見てなかったです」 モッチ「NEW !! (2020-03-22)に書いたから、Corollary 3.12の証明は、もう秘密ではないのだよ」
http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-japanese.html 望月新一論文 宇宙際Teichmuller理論 [3] Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice. PDF NEW !! (2020-03-22) http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf P173 Corollary 3.12. (Log-volume Estimates for Θ-Pilot Objects) Suppose that we are in the situation of Theorem 3.11. Write・・ P174 Proof. We begin by observing that, since |log(q)| > 0, we may assume without loss of generality in the remainder of the proof that・・ P175 Now we proceed to review precisely what is achieved by the various portions of Theorem 3.11 and, indeed, by the theory developed thus far in the present series of papers. This review leads naturally to an interpretation of the theory that gives rise to the inequality asserted in the statement of Corollary 3.12. For ease of reference, we divide our discussion into steps, as follows. (i) In the following discussion, we concentrate on a single arrow ・・ (ii) Whereas the units of the Frobenioids that appear in the・・ (iii) In the following discussion, it will be of crucial importance to relate・・ (iv) The issue discussed in (iii) is relevant in the context of the present・・ (v) Thus, we begin our computation of the 0-column Θ-pilot object in terms of ・ ・ P185 (xii) In the context of the argument of (xi), it is useful to observe the important・・ QED 0432132人目の素数さん2020/03/23(月) 23:11:08.98ID:Ks+XO6mC これでSS側のターンになるのかどうか SSのターンとしてどういう展開になるのか 0433132人目の素数さん2020/03/24(火) 06:35:23.32ID:6W8nuLKY>>431 この10ページ弱の証明を書いてなかったの?そんな行間読めんだろ、普通。 0434132人目の素数さん2020/03/24(火) 08:08:19.78ID:eSkQ42wC いやいや、もう狂ってるでしょw 0435132人目の素数さん2020/03/24(火) 10:46:20.48ID:vr+OyYNX 論点ずれてない?
なお、証明は正しいが、他には応用できない例:4色問題 そういうのもあるにはある IUTが、それかどうか知らないが 0473132人目の素数さん2020/03/27(金) 12:36:10.54ID:G72gJNsM 7 0474132人目の素数さん2020/03/27(金) 14:57:31.03ID:eqFiCM/I 4色問題の証明には証明した人の娘(当時高校生)までも 絵のチェックなどを手伝ってくれたのにIUTを手伝う人がいない 0475132人目の素数さん2020/03/27(金) 15:52:40.22ID:q/ofV46j>>473 4.4のカウントダウンかと思ったが1日ずれてんな 0476132人目の素数さん2020/03/27(金) 17:15:01.14ID:JV2qk9Qn IUTを高校生が手伝う? まじか 0477132人目の素数さん2020/03/27(金) 17:20:39.56ID:FAgN39z2 猫の手じゃダメですか? 0478132人目の素数さん2020/03/27(金) 17:36:09.65ID:GLk7xeaP IUTプロジェクト延期wwww 0479132人目の素数さん2020/03/27(金) 20:08:40.11ID:djqcnjx/ 罹患ともしがたい 0480132人目の素数さん2020/03/27(金) 20:53:50.29ID:tyBUL+dH 2020/3/27 2020年度訪問滞在型研究計画「宇宙際タイヒミューラー理論」(代表者:望月 新一)の一部は感染症予防のため延期となりました。 0481132人目の素数さん2020/03/27(金) 21:03:40.74ID:PNCnIYnChttps://openpayrolls.com/university-college/university-of-arizona/page-341 2019 Kirti N Joshi Associate Professor (Mathematics) University Of Arizona (UA) https://openpayrolls.com/kirti-n-joshi-66718283 Kirti N Joshi (2019) Pay, Salary, Benefits Information Base/Regular Pay $79,153
https://arxiv.org/search/advanced?advanced=&terms-0-operator=AND&terms-0-term=kirti+joshi&terms-0-field=author&classification-mathematics=y&classification-physics_ archives=all&classification-include_cross_list=include&date-filter_by=all_dates&date-year=&date-from_date=&date-to_date=&date-date_type=submitted_date&abstracts=hide&size=50&order=-announced_date_first Showing 1?42 of 42 results 1.arXiv:2003.01890 [pdf, ps, other] math.AG math.NT On Mochizuki's idea of Anabelomorphy and its applications Authors: Kirti Joshi Submitted 3 March, 2020; originally announced March 2020.
3.arXiv:1906.06840 [pdf, other] math.AG math.NT Mochizuki's anabelian variation of ring structures and formal groups Authors: Kirti Joshi Submitted 10 December, 2019; v1 submitted 17 June, 2019; originally announced June 2019.
28.arXiv:0912.3602 [pdf, ps, other] math.AG Hitchin-Mochizuki morphism, Opers and Frobenius-destabilized vector bundles over curves Authors: Kirti Joshi, Christian Pauly Submitted 15 January, 2015; v1 submitted 18 December, 2009; originally announced December 2009.
35.arXiv:math/0110068 [pdf, ps, other] math.AG math.NT A remark on potentially semi-stable representations of Hodge-Tate type (0,1) Authors: Kirti Joshi, Minhyong Kim Submitted 5 October, 2001; originally announced October 2001. Comments: AMSLaTeX; to appear in Math. Zeit Journal ref: Mathematische Zeitschrift 241 no. 3, Pages 479--483 2002
アマゾン/Elliptic-Curves-R-V-Gurjar/dp/8173195021 Elliptic Curves (英語) ハードカバー ? 2006/5/30 R. V. Gurjar (著), Kirti Joshi (著), Mohan Kumar (著) 0482132人目の素数さん2020/03/27(金) 21:17:30.05ID:PNCnIYnC>>481
”28.arXiv:0912.3602 [pdf, ps, other] math.AG Hitchin-Mochizuki morphism, Opers and Frobenius-destabilized vector bundles over curves” は、二人のMochizukiのどちらかな?
”35.arXiv:math/0110068 [pdf, ps, other] math.AG math.NT A remark on potentially semi-stable representations of Hodge-Tate type (0,1) Authors: Kirti Joshi, Minhyong Kim”の ”Minhyong Kim”って、聞いたことある名前だな
2019 Kirti N Joshi Associate Professor (Mathematics) University Of Arizona (UA) 給料 $79,153 だから、1$=110円で 850万くらい? で、米国は厳しいから、大学から評価される 「Kirti N Joshi さん、あなたの2019年の研究成果は?」 ”3.arXiv:1906.06840 [pdf, other] math.AG math.NT Mochizuki's anabelian variation of ring structures and formal groups”です
女子 https://arxiv.org/abs/2003.01890 ”On Mochizuki’s idea of Anabelomorphy and its applications Kirti Joshi March 5, 2020” Abstract: Shinichi Mochizuki has introduced many fundamental ideas in his work, amongst one of them is the foundational notion, which I have dubbed anabelomorphy (pronounced as anabel-o-morphy). I coined the term anabelomorphy as a concise way of expressing "Mochizuki's anabelian way of changing ground field, rings etc." The notion of anabelomorphy is firmly grounded in a well-known theorem of Mochizuki which asserts that a p-adic field is determined by its absolute Galois group equipped with its (upper numbering) ramification filtration. In this paper I provide a number of results which illustrate the usefulness of Mochizuki's idea.
https://arxiv.org/pdf/2003.01890.pdf 26 Perfectoid algebraic geometry as an example of anabelomorphy 61 Now let me record the following observation which I made in the course of writing [Jos19a] and [Jos19b]. A detailed treatment of assertions of this section will be provided in [DJ] where we establish many results in parallel with classical anabelian geometry.
27 The proof of the Fontaine-Colmez Theorem as an example of anabelomorphy on the Hodge side 62 Let me provide an important example of Anabelomorphy which has played a crucial role in the theory of Galois representations. The Colmez-Fontaine Theorem which was conjectured by Jean-Marc Fontaine which asserts that “every weakly admissible filtered (φ, N) module is an admissible filtered (φ, N) module” and proved by Fontaine and Colmez in [CF00].
28 Anabelomorphy for p-adic differential equations 64 This section is independent of the rest of the paper. A reference for this material contained in this section is [And02]. 0491132人目の素数さん2020/03/28(土) 09:37:57.49ID:MRwZqC/h>>490 補足
<References> [DJ] Taylor Dupuy and Kirti Joshi. Perfectoid anbelomorphy.
あと [Jos19a] Kirti Joshi. An impressionistic view of Mochizuki’s proof of Szpiro’s conjecture. 2019. In preparation, available by request.
[DHa] Taylor Dupuy and Anton Hilado. Probabilitic Szpiro, baby Szpiro, and explicit Szpiro from Mochizuki’s corollary 3.12. Preprint.
[DHb] Taylor Dupuy and Anton Hilado. Statement of Mochizuki’s corollary 3.12. Preprint.
この3つは、予定されている 4回の国際会議のどこかで出てくるのでしょうね 0492132人目の素数さん2020/03/28(土) 09:45:01.65ID:MRwZqC/h>>491 >[Jos19a] Kirti Joshi. An impressionistic view of Mochizuki’s proof of Szpiro’s conjecture. 2019. In preparation, available by request. >[DHa] Taylor Dupuy and Anton Hilado. Probabilitic Szpiro, baby Szpiro, and explicit Szpiro from Mochizuki’s corollary 3.12. Preprint. >[DHb] Taylor Dupuy and Anton Hilado. Statement of Mochizuki’s corollary 3.12. Preprint.