# 山下 剛

Last Update: 2021/06/23 13:28:42

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Name(Kanji/Kana/Abecedarium Latinum)

Primary Affiliation(Org1/Job title)
Research Institute for Mathematical Sciences (RIMS)/Senior Lecturer/ Junior Associate Professor
Affiliated programs (koza)
Org1 Job title
Graduate Schools Science Senior Lecturer/ Junior Associate Professor
Office 〒606-8502 京都市左京区北白川追分町 　京都大学 数理解析研究所 Research Institute for Mathematical Sciences, Kyoto University, Kyoto, 606-8502, JAPAN
Field(Japanese) Field(English) University(Japanese) University(English) Method

Language of Instruction
Language(japanese) Language(english) Code

Research Topics
(Japanese)

(English)
Arithmetic Geometry
Fields of research (key words)
Key words(Japanese) Key words(English)

Langlands対応 Langlands correspondences
Published Papers
Author Author(Japanese) Author(English) Title Title(Japanese) Title(English) Bibliography Bibliography(Japanese) Bibliography(English) Publication date Refereed paper Language Publishing type
Go Yamashita 山下 剛 Go Yamashita An introduction to $p$ -adic Hodge theory for open varieties via syntomic cohomology An introduction to $p$ -adic Hodge theory for open varieties via syntomic cohomology An introduction to $p$ -adic Hodge theory for open varieties via syntomic cohomology Panoramas et Syntheses, 54, 131-157 Panoramas et Syntheses, 54, 131-157 Panoramas et Syntheses, 54, 131-157 2019 Refereed English
Go Yamashita 山下 剛 Go Yamashita A small remark on finite multiple zeta values and $p$ -adic multiple zeta values A small remark on finite multiple zeta values and $p$ -adic multiple zeta values A small remark on finite multiple zeta values and $p$ -adic multiple zeta values RIMS Kokyuroku Bessatsu, B68, 171-174 RIMS Kokyuroku Bessatsu, B68, 171-174 RIMS Kokyuroku Bessatsu, B68, 171-174 2017 Refereed English
Go Yamashita 山下 剛 Go Yamashita A small remark on the filtered $\phi$ -module of Fermat varieties and Stickelberger's theorem A small remark on the filtered $\phi$ -module of Fermat varieties and Stickelberger's theorem A small remark on the filtered $\phi$ -module of Fermat varieties and Stickelberger's theorem Tsukuba J. Math., 40, No. 1, 119-124 Tsukuba J. Math., 40, No. 1, 119-124 Tsukuba J. Math., 40, No. 1, 119-124 2016 Refereed English
Go Yamashita, Seidai Yasuda Go Yamashita, Seidai Yasuda Go Yamashita, Seidai Yasuda On some applications of integral p-adic Hodge theory to Galois representations On some applications of integral p-adic Hodge theory to Galois representations On some applications of integral p-adic Hodge theory to Galois representations JOURNAL OF NUMBER THEORY, 147, 721-748 JOURNAL OF NUMBER THEORY, 147, 721-748 JOURNAL OF NUMBER THEORY, 147, 721-748 2015/02 Refereed English Research paper(scientific journal)
Go Yamashita Go Yamashita Go Yamashita A simple proof of convolution identities of Bernoulli numbers A simple proof of convolution identities of Bernoulli numbers A simple proof of convolution identities of Bernoulli numbers PROCEEDINGS OF THE JAPAN ACADEMY SERIES A-MATHEMATICAL SCIENCES, 91, 1, 5-6 PROCEEDINGS OF THE JAPAN ACADEMY SERIES A-MATHEMATICAL SCIENCES, 91, 1, 5-6 PROCEEDINGS OF THE JAPAN ACADEMY SERIES A-MATHEMATICAL SCIENCES, 91, 1, 5-6 2015/01 Refereed English Research paper(scientific journal)
Go Yamashita 山下 剛 Go Yamashita $p$ -adic multiple zeta values, $p$ -adic multiple $L$ -values, and motivic Galois groups. $p$ -adic multiple zeta values, $p$ -adic multiple $L$ -values, and motivic Galois groups. $p$ -adic multiple zeta values, $p$ -adic multiple $L$ -values, and motivic Galois groups. Adv. Studies in Pure Math., 63, 629-658 Adv. Studies in Pure Math., 63, 629-658 Adv. Studies in Pure Math., 63, 629-658 2012 Refereed English
Go Yamashita Go Yamashita Go Yamashita p-Adic Hodge theory for open varieties p-Adic Hodge theory for open varieties p-Adic Hodge theory for open varieties COMPTES RENDUS MATHEMATIQUE, 349, 21-22, 1127-1130 COMPTES RENDUS MATHEMATIQUE, 349, 21-22, 1127-1130 COMPTES RENDUS MATHEMATIQUE, 349, 21-22, 1127-1130 2011/11 Refereed English Research paper(scientific journal)
Go Yamashita 山下 剛 Go Yamashita $p$ -adic Lefschetz (1,1) theorem in semistable case, and Picard number jumping locus $p$ -adic Lefschetz (1,1) theorem in semistable case, and Picard number jumping locus $p$ -adic Lefschetz (1,1) theorem in semistable case, and Picard number jumping locus Math. Res. Let., 18, no. 01, 107-124 Math. Res. Let., 18, no. 01, 107-124 Math. Res. Let., 18, no. 01, 107-124 2011 Refereed English
Go Yamashita 山下 剛 Go Yamashita Bounds for the dimensions of the $p$ -adic multiple $L$ -value spaces Bounds for the dimensions of the $p$ -adic multiple $L$ -value spaces Bounds for the dimensions of the $p$ -adic multiple $L$ -value spaces Documenta Math., Extra Vol., Suslin's Sixtieth Birthday, 687-723 Documenta Math., Extra Vol., Suslin's Sixtieth Birthday, 687-723 Documenta Math., Extra Vol., Suslin's Sixtieth Birthday, 687-723 2010 Refereed English
Title language:
Conference Activities & Talks
Title Title(Japanese) Title(English) Conference Conference(Japanese) Conference(English) Promotor Promotor(Japanese) Promotor(English) Date Language Assortment
ABC Conjecture and Inter-universal Teichmüller Theory ABC Conjecture and Inter-universal Teichmüller Theory ABC Conjecture and Inter-universal Teichmüller Theory Series Lectures at Keio University 集中講義(於慶應義塾大学) Series Lectures at Keio University 2018/11/05 Japanese
Reductions of crystalline representations and Hypergeometric polynomials[Invited] Reductions of crystalline representations and Hypergeometric polynomials [Invited] Reductions of crystalline representations and Hypergeometric polynomials [Invited] Pan Asia Number Theory Conference 2018 Pan Asia Number Theory Conference 2018 Pan Asia Number Theory Conference 2018 2018/06/29 English
A Proof of the ABC Conjecture after Mochizuki[Invited] A Proof of the ABC Conjecture after Mochizuki [Invited] A Proof of the ABC Conjecture after Mochizuki [Invited] Pan Asia Number Theory Conference 2018 Pan Asia Number Theory Conference 2018 Pan Asia Number Theory Conference 2018 2018/06/25 English
A Proof of the ABC Conjecture after Mochizuki A Proof of the ABC Conjecture after Mochizuki A Proof of the ABC Conjecture after Mochizuki séminaire de théorie des nombres at Institut de Mathématiques de Jussieu séminaire de théorie des nombres at Institut de Mathématiques de Jussieu séminaire de théorie des nombres at Institut de Mathématiques de Jussieu 2018/06/18 English
Reductions of crystalline representations and Hypergeometric polynomials Reductions of crystalline representations and Hypergeometric polynomials Reductions of crystalline representations and Hypergeometric polynomials Colloquium at RIMS Colloquium at RIMS Colloquium at RIMS 2016/11/16 Japanese
IUTchIII-IV with remarks on the function-theoretic roots of the theory[Invited] IUTchIII-IV with remarks on the function-theoretic roots of the theory [Invited] IUTchIII-IV with remarks on the function-theoretic roots of the theory [Invited] Inter-universal Teichmüller Theory Summit 2016 Inter-universal Teichmüller Theory Summit 2016 Inter-universal Teichmüller Theory Summit 2016 2016/07/26 English
IUT-III[Invited] IUT-III [Invited] IUT-III [Invited] Clay Math. Institute Workshop: IUT Theory of Shinichi Mochizuki Clay Math. Institute Workshop: IUT Theory of Shinichi Mochizuki Clay Math. Institute Workshop: IUT Theory of Shinichi Mochizuki 2015/12/11 English
IUT-III and IUT-IV section 1 with some remarks on the language of species[Invited] IUT-III and IUT-IV section 1 with some remarks on the language of species [Invited] IUT-III and IUT-IV section 1 with some remarks on the language of species [Invited] Clay Math. Institute Workshop: IUT Theory of Shinichi Mochizuki Clay Math. Institute Workshop: IUT Theory of Shinichi Mochizuki Clay Math. Institute Workshop: IUT Theory of Shinichi Mochizuki 2015/12/11 English
Motivation from Hodge-Arakelov Theory[Invited] Motivation from Hodge-Arakelov Theory [Invited] Motivation from Hodge-Arakelov Theory [Invited] Clay Math. Institute Workshop: IUT Theory of Shinichi Mochizuki Clay Math. Institute Workshop: IUT Theory of Shinichi Mochizuki Clay Math. Institute Workshop: IUT Theory of Shinichi Mochizuki 2015/12/09 English
Inter-universal Teichmuller theory and its Diophantine consequences Inter-universal Teichmuller theory and its Diophantine consequences Inter-universal Teichmuller theory and its Diophantine consequences Series Lectures at Kyushu University 集中講義(於九州大学) Series Lectures at Kyushu University 2015/09/16 Japanese
Inter-universal Teichmuller theory and its Diophantine consequences Inter-universal Teichmuller theory and its Diophantine consequences Inter-universal Teichmuller theory and its Diophantine consequences On the verification and further development of inter-universal Teichmuller theory On the verification and further development of inter-universal Teichmuller theory On the verification and further development of inter-universal Teichmuller theory 2015/03/16 Japanese
Inter-universal Teichmuller theory and its Diophantine consequences Inter-universal Teichmuller theory and its Diophantine consequences Inter-universal Teichmuller theory and its Diophantine consequences On the verification and further development of inter-universal Teichmuller theory On the verification and further development of inter-universal Teichmuller theory On the verification and further development of inter-universal Teichmuller theory 2015/03/09 Japanese

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External funds: competitive funds and Grants-in-Aid for Scientific Research (Kakenhi)
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