過去の記録
過去の記録 ~04/17|本日 04/18 | 今後の予定 04/19~
2012年06月14日(木)
代数幾何学セミナー
13:30-15:00 数理科学研究科棟(駒場) 122号室
Christian Schnell 氏 (IPMU)
Vanishing theorems for perverse sheaves on abelian varieties (ENGLISH)
Christian Schnell 氏 (IPMU)
Vanishing theorems for perverse sheaves on abelian varieties (ENGLISH)
[ 講演概要 ]
I will describe a few results, due to Kraemer-Weissauer and myself, about perverse sheaves on complex abelian varieties; they are natural generalizations of the generic vanishing theorem of Green-Lazarsfeld.
I will describe a few results, due to Kraemer-Weissauer and myself, about perverse sheaves on complex abelian varieties; they are natural generalizations of the generic vanishing theorem of Green-Lazarsfeld.
2012年06月13日(水)
代数学コロキウム
16:40-17:40 数理科学研究科棟(駒場) 056号室
三原朋樹 氏 (東京大学数理科学研究科)
Singular homologies of non-Archimedean analytic spaces and integrals along cycles (JAPANESE)
三原朋樹 氏 (東京大学数理科学研究科)
Singular homologies of non-Archimedean analytic spaces and integrals along cycles (JAPANESE)
[ 講演概要 ]
Berkovichの非アルキメデス的解析空間に新たな特異ホモロジーを定義し、そのホモロジーにおけるサイクルに沿った正則微分形式の積分という新たな概念を考える。Tate曲線においては標準的な体積形式dz/zの積分により周期が得られることを確かめる。
Berkovichの非アルキメデス的解析空間に新たな特異ホモロジーを定義し、そのホモロジーにおけるサイクルに沿った正則微分形式の積分という新たな概念を考える。Tate曲線においては標準的な体積形式dz/zの積分により周期が得られることを確かめる。
講演会
17:00-18:00 数理科学研究科棟(駒場) 122号室
Sunder Sethuraman 氏 (University of Arizona)
A KPZ equation for zero-range interactions (ENGLISH)
Sunder Sethuraman 氏 (University of Arizona)
A KPZ equation for zero-range interactions (ENGLISH)
[ 講演概要 ]
We derive a type of KPZ equation, in terms of a martingale problem, as a scaling limit of fluctuation fields in weakly asymmetric zero-range processes. Joint work (in progress) with Milton Jara and Patricia Goncalves.
We derive a type of KPZ equation, in terms of a martingale problem, as a scaling limit of fluctuation fields in weakly asymmetric zero-range processes. Joint work (in progress) with Milton Jara and Patricia Goncalves.
講演会
11:00-15:30 数理科学研究科棟(駒場) 128号室
S. Harase, et. al. 氏 (Tokyo Institute of Technology/JSPS)
Workshop for Quasi-Monte Carlo and Pseudo Random Number Generation (ENGLISH)
[ 参考URL ]
http://sites.google.com/a/craft.titech.ac.jp/workshop-on-qmc-and-prng-2012-utms/
S. Harase, et. al. 氏 (Tokyo Institute of Technology/JSPS)
Workshop for Quasi-Monte Carlo and Pseudo Random Number Generation (ENGLISH)
[ 参考URL ]
http://sites.google.com/a/craft.titech.ac.jp/workshop-on-qmc-and-prng-2012-utms/
2012年06月12日(火)
トポロジー火曜セミナー
16:30-18:00 数理科学研究科棟(駒場) 056号室
Tea: 16:00 - 16:30 コモンルーム
野坂 武史 氏 (京都大学 数理解析研究所, 日本学術振興会)
Topological interpretation of the quandle cocycle invariants of links (JAPANESE)
Tea: 16:00 - 16:30 コモンルーム
野坂 武史 氏 (京都大学 数理解析研究所, 日本学術振興会)
Topological interpretation of the quandle cocycle invariants of links (JAPANESE)
[ 講演概要 ]
Carter et al. introduced many quandle cocycle invariants
combinatorially constructed from link-diagrams. For connected quandles of
finite order, we give a topological meaning of the invariants, without
some torsion parts. Precisely, this invariant equals a sum of "knot
colouring polynomial" and of a Z-equivariant part of the Dijkgraaf-Witten
invariant. Moreover, our approach involves applications to compute "good"
torsion subgroups of the 3-rd quandle homologies and the 2-nd homotopy
groups of rack spaces.
Carter et al. introduced many quandle cocycle invariants
combinatorially constructed from link-diagrams. For connected quandles of
finite order, we give a topological meaning of the invariants, without
some torsion parts. Precisely, this invariant equals a sum of "knot
colouring polynomial" and of a Z-equivariant part of the Dijkgraaf-Witten
invariant. Moreover, our approach involves applications to compute "good"
torsion subgroups of the 3-rd quandle homologies and the 2-nd homotopy
groups of rack spaces.
Lie群論・表現論セミナー
16:30-18:00 数理科学研究科棟(駒場) 126号室
久保利久 氏 (東京大学大学院数理科学研究科)
Conformally invariant systems of differential operators of non-Heisenberg parabolic type (ENGLISH)
久保利久 氏 (東京大学大学院数理科学研究科)
Conformally invariant systems of differential operators of non-Heisenberg parabolic type (ENGLISH)
[ 講演概要 ]
Minkowski space上のwave operatorはconformally invariant operatorの典型的な例である。
近年、Barchini-Kable-Zierauによって1つのdifferential operatorの
conformal invarianceがそのsystemに一般化された (conformally invariant systems)。
このセミナーではmaximal non-Heisenberg parabolicを使って、
その様なsecond order differential operatorのsystemを作りたい。
またconformally invariant systemは、あるgeneralized Verma module間のhomomorphismを誘導するが、もし時間が許せばそれについても述べたい。
Minkowski space上のwave operatorはconformally invariant operatorの典型的な例である。
近年、Barchini-Kable-Zierauによって1つのdifferential operatorの
conformal invarianceがそのsystemに一般化された (conformally invariant systems)。
このセミナーではmaximal non-Heisenberg parabolicを使って、
その様なsecond order differential operatorのsystemを作りたい。
またconformally invariant systemは、あるgeneralized Verma module間のhomomorphismを誘導するが、もし時間が許せばそれについても述べたい。
講演会
09:50-17:10 数理科学研究科棟(駒場) 118号室
Josef Dick, et. al. 氏 (Univ. New South Wales)
Workshop for Quasi-Monte Carlo and Pseudo Random Number Generation (ENGLISH)
[ 参考URL ]
http://sites.google.com/a/craft.titech.ac.jp/workshop-on-qmc-and-prng-2012-utms/
Josef Dick, et. al. 氏 (Univ. New South Wales)
Workshop for Quasi-Monte Carlo and Pseudo Random Number Generation (ENGLISH)
[ 参考URL ]
http://sites.google.com/a/craft.titech.ac.jp/workshop-on-qmc-and-prng-2012-utms/
2012年06月11日(月)
Kavli IPMU Komaba Seminar
16:30-18:00 数理科学研究科棟(駒場) 002号室
Changzheng Li 氏 (Kavli IPMU)
Quantum cohomology of flag varieties (ENGLISH)
Changzheng Li 氏 (Kavli IPMU)
Quantum cohomology of flag varieties (ENGLISH)
[ 講演概要 ]
In this talk, I will give a brief introduction to the quantum cohomology of flag varieties first. Then I will introduce a Z^2-filtration on the quantum cohomology of complete flag varieties. In the end, we will study the quantum Pieri rules for complex/symplectic Grassmannians, as applications of the Z^2-filtration.
In this talk, I will give a brief introduction to the quantum cohomology of flag varieties first. Then I will introduce a Z^2-filtration on the quantum cohomology of complete flag varieties. In the end, we will study the quantum Pieri rules for complex/symplectic Grassmannians, as applications of the Z^2-filtration.
複素解析幾何セミナー
10:30-12:00 数理科学研究科棟(駒場) 126号室
Damian BROTBEK 氏 (University of Tokyo)
Differential forms on complete intersections (ENGLISH)
Damian BROTBEK 氏 (University of Tokyo)
Differential forms on complete intersections (ENGLISH)
[ 講演概要 ]
Brückmann and Rackwitz proved a vanishing result for particular types of differential forms on complete intersection varieties. We will be interested in the cases not covered by their result. In some cases, we will show how the space $H^0(X,S^{m_1}\Omega_X\otimes \cdots \otimes S^{m_k}\Omega_X)$ depends on the equations defining $X$, and in particular we will prove that the theorem of Brückmann and Rackwitz is optimal. The proofs are based on simple, combinatorial, cohomology computations.
Brückmann and Rackwitz proved a vanishing result for particular types of differential forms on complete intersection varieties. We will be interested in the cases not covered by their result. In some cases, we will show how the space $H^0(X,S^{m_1}\Omega_X\otimes \cdots \otimes S^{m_k}\Omega_X)$ depends on the equations defining $X$, and in particular we will prove that the theorem of Brückmann and Rackwitz is optimal. The proofs are based on simple, combinatorial, cohomology computations.
2012年06月09日(土)
調和解析駒場セミナー
13:30-17:00 数理科学研究科棟(駒場) 128号室
このセミナーは,月に1度程度,不定期に開催されます.
古谷康雄 氏 (東海大学
) 13:30-15:00
Cauchy積分に関する最近の話題(Muscaluらの仕事)
(JAPANESE)
) 15:30-17:00
Ill-posedness for the nonlinear Schr\\"odinger equations in one
space dimension
(JAPANESE)
このセミナーは,月に1度程度,不定期に開催されます.
古谷康雄 氏 (東海大学
) 13:30-15:00
Cauchy積分に関する最近の話題(Muscaluらの仕事)
(JAPANESE)
[ 講演概要 ]
多重線形特異積分に関する Muscalu, Pipher, Tao, Thieleらの一連の仕事のほんの一部分を紹介する.キーワードはシンボル評価とshifted maximal function.
参考文献は Math. arXiv. に載っている Muscalu の三部作
岩渕 司 氏 (中央大学多重線形特異積分に関する Muscalu, Pipher, Tao, Thieleらの一連の仕事のほんの一部分を紹介する.キーワードはシンボル評価とshifted maximal function.
参考文献は Math. arXiv. に載っている Muscalu の三部作
) 15:30-17:00
Ill-posedness for the nonlinear Schr\\"odinger equations in one
space dimension
(JAPANESE)
[ 講演概要 ]
In this talk, we consider the Cauchy problems for the nonlinear Schr\\"odinger equations. In particular, we study the ill-posedness by showing that the continuous dependence on initial data does not hold. In the known results, Bejenaru-Tao (2006) considered the problem in the Sobolev spaces $H^s (\\mathbb R)$ and showed the ill-posedness when $s < -1 $. In this talk, we study the ill-posedness in the Besov space for one space dimension and in the Sobolev spaces for two space dimensions.
In this talk, we consider the Cauchy problems for the nonlinear Schr\\"odinger equations. In particular, we study the ill-posedness by showing that the continuous dependence on initial data does not hold. In the known results, Bejenaru-Tao (2006) considered the problem in the Sobolev spaces $H^s (\\mathbb R)$ and showed the ill-posedness when $s < -1 $. In this talk, we study the ill-posedness in the Besov space for one space dimension and in the Sobolev spaces for two space dimensions.
2012年06月08日(金)
GCOEレクチャーズ
14:00-15:30 数理科学研究科棟(駒場) 118号室
Mihnea Popa 氏 (University of Illinois at Chicago)
Derived categories and cohomological invariants II (ENGLISH)
Mihnea Popa 氏 (University of Illinois at Chicago)
Derived categories and cohomological invariants II (ENGLISH)
[ 講演概要 ]
(Abstract for both Parts I and II)
I will discuss results on the derived invariance of various cohomological quantities, like the Hodge numbers, a twisted version of Hochschild cohomology, the Picard variety, and cohomological support loci. I will include a small discussion of current work on orbifolds if time permits.
(Abstract for both Parts I and II)
I will discuss results on the derived invariance of various cohomological quantities, like the Hodge numbers, a twisted version of Hochschild cohomology, the Picard variety, and cohomological support loci. I will include a small discussion of current work on orbifolds if time permits.
Kavli IPMU Komaba Seminar
16:30-18:00 数理科学研究科棟(駒場) 002号室
Bong Lian 氏 (Brandeis University)
Period Integrals and Tautological Systems (ENGLISH)
Bong Lian 氏 (Brandeis University)
Period Integrals and Tautological Systems (ENGLISH)
[ 講演概要 ]
We develop a global Poincar\\'e residue formula to study
period integrals of families of complex manifolds. For any compact
complex manifold $X$ equipped with a linear system $V^*$ of
generically smooth CY hypersurfaces, the formula expresses period
integrals in terms of a canonical global meromorphic top form on $X$.
Two important ingredients of this construction are the notion of a CY
principal bundle, and a classification of such rank one bundles.
We also generalize the construction to CY and general type complete
intersections. When $X$ is an algebraic manifold having a sufficiently
large automorphism group $G$ and $V^*$ is a linear representation of
$G$, we construct a holonomic D-module that governs the period
integrals. The construction is based in part on the theory of
tautological systems we have developed earlier. The approach allows us
to explicitly describe a Picard-Fuchs type system for complete
intersection varieties of general types, as well as CY, in any Fano
variety, and in a homogeneous space in particular. In addition, the
approach provides a new perspective of old examples such as CY
complete intersections in a toric variety or partial flag variety. The
talk is based on recent joint work with R. Song and S.T. Yau.
We develop a global Poincar\\'e residue formula to study
period integrals of families of complex manifolds. For any compact
complex manifold $X$ equipped with a linear system $V^*$ of
generically smooth CY hypersurfaces, the formula expresses period
integrals in terms of a canonical global meromorphic top form on $X$.
Two important ingredients of this construction are the notion of a CY
principal bundle, and a classification of such rank one bundles.
We also generalize the construction to CY and general type complete
intersections. When $X$ is an algebraic manifold having a sufficiently
large automorphism group $G$ and $V^*$ is a linear representation of
$G$, we construct a holonomic D-module that governs the period
integrals. The construction is based in part on the theory of
tautological systems we have developed earlier. The approach allows us
to explicitly describe a Picard-Fuchs type system for complete
intersection varieties of general types, as well as CY, in any Fano
variety, and in a homogeneous space in particular. In addition, the
approach provides a new perspective of old examples such as CY
complete intersections in a toric variety or partial flag variety. The
talk is based on recent joint work with R. Song and S.T. Yau.
2012年06月05日(火)
トポロジー火曜セミナー
16:30-18:00 数理科学研究科棟(駒場) 056号室
Tea: 16:00 - 16:30 コモンルーム
久野 雄介 氏 (津田塾大学)
A generalization of Dehn twists (JAPANESE)
Tea: 16:00 - 16:30 コモンルーム
久野 雄介 氏 (津田塾大学)
A generalization of Dehn twists (JAPANESE)
[ 講演概要 ]
We introduce a generalization
of Dehn twists for loops which are not
necessarily simple loops on an oriented surface.
Our generalization is an element of a certain
enlargement of the mapping class group of the surface.
A natural question is whether a generalized Dehn twist is
in the mapping class group. We show some results related to this question.
This talk is partially based on a joint work
with Nariya Kawazumi (Univ. Tokyo).
We introduce a generalization
of Dehn twists for loops which are not
necessarily simple loops on an oriented surface.
Our generalization is an element of a certain
enlargement of the mapping class group of the surface.
A natural question is whether a generalized Dehn twist is
in the mapping class group. We show some results related to this question.
This talk is partially based on a joint work
with Nariya Kawazumi (Univ. Tokyo).
GCOEレクチャーズ
16:30-18:00 数理科学研究科棟(駒場) 126号室
Yves Benoist 氏 (CNRS, Orsay)
Random walk on reductive groups II (ENGLISH)
Yves Benoist 氏 (CNRS, Orsay)
Random walk on reductive groups II (ENGLISH)
[ 講演概要 ]
The asymptotic behavior of the sum of real numbers chosen independantly with same probability law is controled by many classical theorems: Law of Large Numbers, Central Limit Theorem, Law of Iterated Logarithm, Local Limit Theorem, Large deviation Principle, 0-1 Law,... In these introductory talks I will recall these classical results and explain their analogs for products of matrices chosen independantly with same probability law, when the action of the support of the law is semisimple. We will see that the dynamics of the corresponding action on the flag variety is a crucial tool for studying these non-commutative random walks.
The asymptotic behavior of the sum of real numbers chosen independantly with same probability law is controled by many classical theorems: Law of Large Numbers, Central Limit Theorem, Law of Iterated Logarithm, Local Limit Theorem, Large deviation Principle, 0-1 Law,... In these introductory talks I will recall these classical results and explain their analogs for products of matrices chosen independantly with same probability law, when the action of the support of the law is semisimple. We will see that the dynamics of the corresponding action on the flag variety is a crucial tool for studying these non-commutative random walks.
Lie群論・表現論セミナー
16:30-18:00 数理科学研究科棟(駒場) 126号室
GCOE lectures
Yves Benoist 氏 (CNRS and Orsay)
Random walk on reductive groups (ENGLISH)
GCOE lectures
Yves Benoist 氏 (CNRS and Orsay)
Random walk on reductive groups (ENGLISH)
[ 講演概要 ]
The asymptotic behavior of the sum of real numbers chosen independantly with same probability law is controled by many classical theorems: Law of Large Numbers, Central Limit Theorem, Law of Iterated Logarithm, Local Limit Theorem, Large deviation Principle, 0-1 Law,... In these introductory talks I will recall these classical results and explain their analogs for products of matrices chosen independantly with same probability law, when the action of the support of the law is semisimple. We will see that the dynamics of the corresponding action on the flag variety is a crucial tool for studying these non-commutative random walks.
The asymptotic behavior of the sum of real numbers chosen independantly with same probability law is controled by many classical theorems: Law of Large Numbers, Central Limit Theorem, Law of Iterated Logarithm, Local Limit Theorem, Large deviation Principle, 0-1 Law,... In these introductory talks I will recall these classical results and explain their analogs for products of matrices chosen independantly with same probability law, when the action of the support of the law is semisimple. We will see that the dynamics of the corresponding action on the flag variety is a crucial tool for studying these non-commutative random walks.
2012年06月04日(月)
代数幾何学セミナー
15:30-17:00 数理科学研究科棟(駒場) 122号室
渡辺究 氏 (埼玉大学)
Smooth P1-fibrations and Campana-Peternell conjecture (ENGLISH)
渡辺究 氏 (埼玉大学)
Smooth P1-fibrations and Campana-Peternell conjecture (ENGLISH)
[ 講演概要 ]
We give a complete classification of smooth P1-fibrations
over projective manifolds of Picard number 1 each of which admit another
smooth morphism of relative dimension one.
Furthermore, we consider relations of the result with Campana-Peternell conjecture
on Fano manifolds with nef tangent bundle.
We give a complete classification of smooth P1-fibrations
over projective manifolds of Picard number 1 each of which admit another
smooth morphism of relative dimension one.
Furthermore, we consider relations of the result with Campana-Peternell conjecture
on Fano manifolds with nef tangent bundle.
複素解析幾何セミナー
10:30-12:00 数理科学研究科棟(駒場) 126号室
濱野 佐知子 氏 (福島大学)
Log-plurisubharmonicity of metric deformations induced by Schiffer and harmonic spans. (JAPANESE)
濱野 佐知子 氏 (福島大学)
Log-plurisubharmonicity of metric deformations induced by Schiffer and harmonic spans. (JAPANESE)
[ 講演概要 ]
平面領域の Schiffer span および harmonic span は曲率負の距離を導くことを示し、複素パラメータ―を入れた複素2次元の空間が擬凸状の場合、ファイバーのそれらの距離は複素パラメータ―と共に対数的多重劣調和であることを示す。
平面領域の Schiffer span および harmonic span は曲率負の距離を導くことを示し、複素パラメータ―を入れた複素2次元の空間が擬凸状の場合、ファイバーのそれらの距離は複素パラメータ―と共に対数的多重劣調和であることを示す。
2012年06月01日(金)
GCOEレクチャーズ
14:00-15:30 数理科学研究科棟(駒場) 118号室
Mihnea Popa 氏 (University of Illinois at Chicago)
Derived categories and cohomological invariants I (ENGLISH)
Mihnea Popa 氏 (University of Illinois at Chicago)
Derived categories and cohomological invariants I (ENGLISH)
[ 講演概要 ]
(Abstract for both Parts I and II)
I will discuss results on the derived invariance of various cohomological quantities, like the Hodge numbers, a twisted version of Hochschild cohomology, the Picard variety, and cohomological support loci. I will include a small discussion of current work on orbifolds if time permits.
(Abstract for both Parts I and II)
I will discuss results on the derived invariance of various cohomological quantities, like the Hodge numbers, a twisted version of Hochschild cohomology, the Picard variety, and cohomological support loci. I will include a small discussion of current work on orbifolds if time permits.
2012年05月31日(木)
統計数学セミナー
14:50-16:05 数理科学研究科棟(駒場) 006号室
参加をご希望される方は鎌谷 (阪大基礎工); kamatani at sigmath.es.osaka-u.ac.jpまでご連絡ください.
清 智也 氏 (慶應義塾大学 理工学部 数理科学科)
尤度計算のためのホロノミック勾配法 (JAPANESE)
https://www.ms.u-tokyo.ac.jp/~kengok/statseminar/2012/05.html
参加をご希望される方は鎌谷 (阪大基礎工); kamatani at sigmath.es.osaka-u.ac.jpまでご連絡ください.
清 智也 氏 (慶應義塾大学 理工学部 数理科学科)
尤度計算のためのホロノミック勾配法 (JAPANESE)
[ 講演概要 ]
一般に,尤度関数に現れる正規化定数が解析的に求まらない場合,それを精度よく計算するには数値積分法や級数展開法を用いる必要がある.そして,いずれも多くの計算量を必要とする. 今回紹介するホロノミック勾配法は,ホロノミック性と呼ばれる良い性質を満たす関数に対し,関数値を複数の点(あるいは級数展開法では評価しにくい点)で計算する必要がある場合に,計算量の軽減が期待できる数値計算手法である. 特に,方向統計学に現れるFisher-Bingham分布族の正規化定数などは,ホロノミック性を満たすことを説明する. (参考文献:Nakayama et al. (2011), Adv. Appl. Math., 47 (3), 639--658. ほか)
[ 参考URL ]一般に,尤度関数に現れる正規化定数が解析的に求まらない場合,それを精度よく計算するには数値積分法や級数展開法を用いる必要がある.そして,いずれも多くの計算量を必要とする. 今回紹介するホロノミック勾配法は,ホロノミック性と呼ばれる良い性質を満たす関数に対し,関数値を複数の点(あるいは級数展開法では評価しにくい点)で計算する必要がある場合に,計算量の軽減が期待できる数値計算手法である. 特に,方向統計学に現れるFisher-Bingham分布族の正規化定数などは,ホロノミック性を満たすことを説明する. (参考文献:Nakayama et al. (2011), Adv. Appl. Math., 47 (3), 639--658. ほか)
https://www.ms.u-tokyo.ac.jp/~kengok/statseminar/2012/05.html
2012年05月30日(水)
代数学コロキウム
16:40-17:40 数理科学研究科棟(駒場) 056号室
Valentina Di Proietto 氏 (東京大学数理科学研究科)
Kernel of the monodromy operator for semistable curves (ENGLISH)
Valentina Di Proietto 氏 (東京大学数理科学研究科)
Kernel of the monodromy operator for semistable curves (ENGLISH)
[ 講演概要 ]
For a semistable curve, we study the action of the monodromy operator on the first log-crystalline cohomology group. In particular we examine the relation between the kernel of the monodromy operator and the first rigid cohomology group, in the case of trivial coefficients, giving a new proof of a theorem of B. Chiarellotto and in the case of certain unipotent F-isocrystals as coefficients.
This is a joint work in progress with B. Chiarellotto, R. Coleman and A. Iovita.
For a semistable curve, we study the action of the monodromy operator on the first log-crystalline cohomology group. In particular we examine the relation between the kernel of the monodromy operator and the first rigid cohomology group, in the case of trivial coefficients, giving a new proof of a theorem of B. Chiarellotto and in the case of certain unipotent F-isocrystals as coefficients.
This is a joint work in progress with B. Chiarellotto, R. Coleman and A. Iovita.
講演会
14:50-16:20 数理科学研究科棟(駒場) 123号室
This is the fourth of four lectures planned on 5/25, 5/28, 5/29 and 5/30.
Harald Niederreiter 氏 (RICAM, Austrian Academy of Sciences)
Low-discrepancy sequences and algebraic curves over finite fields (III) (ENGLISH)
[ 参考URL ]
https://www.ms.u-tokyo.ac.jp/~matumoto/WORKSHOP/workshop2012.html
This is the fourth of four lectures planned on 5/25, 5/28, 5/29 and 5/30.
Harald Niederreiter 氏 (RICAM, Austrian Academy of Sciences)
Low-discrepancy sequences and algebraic curves over finite fields (III) (ENGLISH)
[ 参考URL ]
https://www.ms.u-tokyo.ac.jp/~matumoto/WORKSHOP/workshop2012.html
2012年05月29日(火)
トポロジー火曜セミナー
16:30-18:00 数理科学研究科棟(駒場) 056号室
Tea: 16:00 - 16:30 コモンルーム
中村 伊南沙 氏 (学習院大学,日本学術振興会)
Triple linking numbers and triple point numbers
of torus-covering $T^2$-links
(JAPANESE)
Tea: 16:00 - 16:30 コモンルーム
中村 伊南沙 氏 (学習院大学,日本学術振興会)
Triple linking numbers and triple point numbers
of torus-covering $T^2$-links
(JAPANESE)
[ 講演概要 ]
The triple linking number of an oriented surface link was defined as an
analogical notion of the linking number of a classical link. A
torus-covering $T^2$-link $\\mathcal{S}_m(a,b)$ is a surface link in the
form of an unbranched covering over the standard torus, determined from
two commutative $m$-braids $a$ and $b$.
In this talk, we consider $\\mathcal{S}_m(a,b)$ when $a$, $b$ are pure
$m$-braids ($m \\geq 3$), which is a surface link with $m$-components. We
present the triple linking number of $\\mathcal{S}_m(a,b)$ by using the
linking numbers of the closures of $a$ and $b$. This gives a lower bound
of the triple point number. In some cases, we can determine the triple
point numbers, each of which is a multiple of four.
The triple linking number of an oriented surface link was defined as an
analogical notion of the linking number of a classical link. A
torus-covering $T^2$-link $\\mathcal{S}_m(a,b)$ is a surface link in the
form of an unbranched covering over the standard torus, determined from
two commutative $m$-braids $a$ and $b$.
In this talk, we consider $\\mathcal{S}_m(a,b)$ when $a$, $b$ are pure
$m$-braids ($m \\geq 3$), which is a surface link with $m$-components. We
present the triple linking number of $\\mathcal{S}_m(a,b)$ by using the
linking numbers of the closures of $a$ and $b$. This gives a lower bound
of the triple point number. In some cases, we can determine the triple
point numbers, each of which is a multiple of four.
GCOEレクチャーズ
16:30-18:00 数理科学研究科棟(駒場) 126号室
Yves Benoist 氏 (CNRS, Orsay)
Random walk on reductive groups. (ENGLISH)
Yves Benoist 氏 (CNRS, Orsay)
Random walk on reductive groups. (ENGLISH)
[ 講演概要 ]
The asymptotic behavior of the sum of real numbers chosen independantly with same probability law is controled by many classical theorems: Law of Large Numbers, Central Limit Theorem, Law of Iterated Logarithm, Local Limit Theorem, Large deviation Principle, 0-1 Law,... In these introductory talks I will recall these classical results and explain their analogs for products of matrices chosen independantly with same probability law, when the action of the support of the law is semisimple. We will see that the dynamics of the corresponding action on the flag variety is a crucial tool for studying these non-commutative random walks.
The asymptotic behavior of the sum of real numbers chosen independantly with same probability law is controled by many classical theorems: Law of Large Numbers, Central Limit Theorem, Law of Iterated Logarithm, Local Limit Theorem, Large deviation Principle, 0-1 Law,... In these introductory talks I will recall these classical results and explain their analogs for products of matrices chosen independantly with same probability law, when the action of the support of the law is semisimple. We will see that the dynamics of the corresponding action on the flag variety is a crucial tool for studying these non-commutative random walks.
講演会
14:50-16:20 数理科学研究科棟(駒場) 123号室
This is the third of four lectures; the first is the colloquium on May 25th(Fri) 16:30--17:30 at 002 and the second is on May 28th(Mon).
Harald Niederreiter 氏 (RICAM, Austrian Academy of Sciences)
Low-discrepancy sequences and algebraic curves over finite fields (II) (ENGLISH)
[ 参考URL ]
https://www.ms.u-tokyo.ac.jp/~matumoto/WORKSHOP/workshop2012.html
This is the third of four lectures; the first is the colloquium on May 25th(Fri) 16:30--17:30 at 002 and the second is on May 28th(Mon).
Harald Niederreiter 氏 (RICAM, Austrian Academy of Sciences)
Low-discrepancy sequences and algebraic curves over finite fields (II) (ENGLISH)
[ 参考URL ]
https://www.ms.u-tokyo.ac.jp/~matumoto/WORKSHOP/workshop2012.html
2012年05月28日(月)
複素解析幾何セミナー
10:30-12:00 数理科学研究科棟(駒場) 126号室
田島 慎一 氏 (筑波大学)
Local cohomology and hypersurface isolated singularities II (JAPANESE)
田島 慎一 氏 (筑波大学)
Local cohomology and hypersurface isolated singularities II (JAPANESE)
[ 講演概要 ]
局所コホモロジーの孤立特異点への応用として
・$\mu$-constant-deformation の Tjurina 数
・対数的ベクトル場の構造と構成法
・ニュートン非退化な超曲面に対する Kouchnirenko の公式
について述べる.
局所コホモロジーの孤立特異点への応用として
・$\mu$-constant-deformation の Tjurina 数
・対数的ベクトル場の構造と構成法
・ニュートン非退化な超曲面に対する Kouchnirenko の公式
について述べる.
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