今後の予定

2018年06月25日(月)

東京確率論セミナー

16:00-17:30 数理科学研究科棟(駒場) 126号室
濱口　雄史氏 (京都大学大学院理学研究科)
BSDEs driven by cylindrical martingales with application to approximate hedging in bond markets (JAPANESE)

[ 講演概要 ]
金利マーケットや商品先物市場では、フォワードカーブのランダムな時間発展挙動を連続関数空間上の無限次元確率過程として記述する手法が用いられる。このモデルでは形式的に非加算無限個の取引可能財が存在するため、ボンドの満期を表す区間上の符号付測度に値を取るポートフォリオを考えることとなる。本講演では、無限次元マーケットにおけるクレームのヘッジに関連して、無限次元マルチンゲール(連続関数空間上のcylindrical martingale)により駆動するリプシッツ型BSDEの解の存在と一意性を示す。さらに、この解が対応する有限次元BSDEの解によって近似できることを示す。これにより、無限次元マーケットにおけるクレームの形式的なヘッジ戦略が、有限次元部分マーケットにおけるFollmer-Schweizer分解、すなわち局所リスク最少戦略の極限として得られることが従う。

離散数理モデリングセミナー

17:30-18:30 数理科学研究科棟(駒場) 056号室
Anton Dzhamay 氏 (University of Northern Colorado)
Gap Probabilities and discrete Painlevé equations

[ 講演概要 ]
It is well-known that important statistical quantities, such as gap probabilities, in various discrete probabilistic models of random matrix type satisfy the so-called discrete Painlevé equations, which provides an effective way to computing them. In this talk we discuss this correspondence for a particular class of models, known as boxed plane partitions (equivalently, lozenge tilings of a hexagon). For uniform probability distribution, this is one of the most studied models of random surfaces. Borodin, Gorin, and Rains showed that it is possible to assign a very general elliptic weight to the distribution, with various degenerations of this weight corresponding to the degeneration cascade of discrete polynomial ensembles, such as Racah and Hahn ensembles and their q-analogues. This also correspond to the degeneration scheme of discrete Painlevé equations, due to Sakai. In this talk we consider the q-Hahn and q-Racah ensembles and corresponding discrete Painlevé equations of types q-P(A_{2}^{(1)}) and q-P(A_{1}^{(1)}).
This is joint work with Alisa Knizel (Columbia University)

複素解析幾何セミナー

10:30-12:00 数理科学研究科棟(駒場) 128号室
Stephen McKeown 氏 (Princeton University)
Cornered Asymptotically Hyperbolic Spaces

[ 講演概要 ]
This talk will concern cornered asymptotically hyperbolic spaces, which have a finite boundary in addition to the usual infinite boundary. I will first describe the construction a normal form near the corner for these spaces. Then I will discuss formal existence and uniqueness, near the corner, of asymptotically hyperbolic Einstein metrics, with a CMC-umbilic condition imposed on the finite boundary. This is analogous to the Fefferman-Graham construction for the ordinary, non-cornered setting. Finally, I will present work in progress regarding scattering on such spaces.

2018年06月26日(火)

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)
Varieties with nef diagonal (English)

[ 講演概要 ]
For a smooth projective variety $X$, we consider when the diagonal $Δ _X$ is nef as a
cycle on $X \times X$. In particular, we give a classication of complete intersections and smooth
del Pezzo varieties where the diagonal is nef. We also study the nefness of the diagonal for
spherical varieties. This is a joint work with Taku Suzuki.

解析学火曜セミナー

16:50-18:20 数理科学研究科棟(駒場) 128号室
小川卓克氏 (東北大学)
移流拡散方程式の初期値問題について (日本語)

[ 講演概要 ]
We consider the Cauchy problem of the drift-diffusion system in the whole space. Introducing the scaling critical case, we consider the solvability of the drift-diffusion system in the whole space and give some large time behavior of solutions. This talk is based on a collaboration with Masaki Kurokiba and Hiroshi Wakui.

2018年06月27日(水)

作用素環セミナー

16:45-18:15 数理科学研究科棟(駒場) 126号室
Seung-Hyeok Kye 氏 (Seoul National Univ.)
未定

2018年06月29日(金)

談話会・数理科学講演会

15:30-16:30 数理科学研究科棟(駒場) 056号室
石毛和弘氏 (東京大学大学院数理科学研究科)
放物型方程式の解の冪凸性 (日本語)

[ 講演概要 ]
放物型方程式の解の凸冪性の研究は、Brascamp-Lieb (1976), Korevaar (1983)らの研究を契機として大きく進展し、例えば、正値な値をもつ初期関数の対数が上に凸であるとき、熱流はその凸性を保つこと等が解明されてきた。
本講演では、これら一連の研究を概観した後、Paolo Salani 氏らとの共同研究に基づき、放物型冪凸という概念の導入とその応用、放物型方程式系の解の冪凸性等について述べ、さらに近年の研究の進展について触れる。

2018年07月02日(月)

東京確率論セミナー

16:00-17:30 数理科学研究科棟(駒場) 126号室
世良　透氏 (京都大学大学院理学研究科)
間欠力学系に関する種々の分布極限定理 (JAPANESE)

[ 講演概要 ]
間欠力学系とは，中立不動点を持つ一次元写像力学系のことである．この力学系は様々な非平衡系に現れる間欠現象のモデルとして，統計物理学などの観点から広く研究されてきた．間欠現象とは，ほぼ周期的かつ持続的な「安定状態」が，非周期的かつ一時的に生ずる「不安定状態」によって繰り返し中断される，という現象を指す．Lorenz(1963)は熱対流の微分方程式モデルを研究し，解軌道の数値プロットから間欠力学系を抽出した．Pomeau--Manneville(1980)は「熱対流の安定状態」を「間欠力学系の中立不動点」と見なして，間欠力学系を介してLorenzの熱対流モデルが持つ間欠性を考察している．

また，間欠力学系は無限エルゴード理論などの観点からも研究され，Markov過程論のアナロジーから種々の分布極限定理が得られてきた．本講演では間欠力学系に関する分布極限定理として，中立不動点から離れた場所(不安定状態)への滞在に関するAaronson(1981)&(1986)，Owada--Samorodnitsky(2015)の結果，および中立不動点近傍(安定状態)への滞在に関するThaler(2002)，S.--Yano(2017+)の結果を紹介する．そしてこれらを統合・精密化した講演者の最近の結果について述べる．間欠力学系の滞在時間のスケール極限として，マルチレイ上を走る歪みBessel拡散過程の原点局所時間や各レイごとの滞在時間が現れる．証明の鍵は周遊理論およびTyran-Kaminska(2010)による定常増分過程の関数型極限定理である．

複素解析幾何セミナー

10:30-12:00 数理科学研究科棟(駒場) 128号室
松崎克彦氏 (早稲田大学)
Rigidity of certain groups of circle homeomorphisms and Teichmueller spaces (JAPANESE)

[ 講演概要 ]
In this talk, I explain a complex analytic method and its applications
for the study of quasisymmetric homeomorphisms of the circle by extending them to the unit disk quasiconformally.
In RIMS conference "Open Problems in Complex Geometry'' held in 2010,
I gave a talk entitled "Problems on infinite dimensional Teichmueller spaces", and
mentioned several problems on the fixed points of group actions on
the universal Teichmueller space and its subspaces, and the rigidity of conjugation of
certain groups of circle homeomorphisms.
I will report on the development of these problems since then.

PDE実解析研究会

10:30-11:30 数理科学研究科棟(駒場) 056号室
通常の曜日と異なります。
László Székelyhidi Jr. 氏 (Universität Leipzig)
Convex integration in fluid dynamics (English)

[ 講演概要 ]
In the talk we present the technique of convex integration for constructing weak solutions to various equations in fluid mechanics.
We will focus on the recent resolution of Onsagers conjecture, but also discuss further directions and in particular the applicability to dissipative systems.

2018年07月03日(火)

トポロジー火曜セミナー

17:00-18:00 数理科学研究科棟(駒場) 056号室
Tea: Common Room 16:30-17:00
吉田純氏 (東京大学大学院数理科学研究科)
Symmetries on algebras and Hochschild homology in view of categories of operators (JAPANESE)

[ 講演概要 ]
The categorical construction of Hochschild homology by Connes reveals that the symmetric structure on the tensor product of abelian groups is essential. It means that the categorical meaning of ad-hoc generalizations of Hochschild homology in less symmetric monoidal abelian categories remains unclear. In this talk, I will propose formulation of this problem in terms of group operads introduced by Zhang. Moreover, for each group operad G, G-symmetric versions of categories of operators will be discussed. The notion plays a key role in defining Hochschild homology for homotopy algebras; such as topological Hochschild homology.

2018年07月09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) 128号室
Casey Kelleher 氏 (Princeton University)
(ENGLISH)

2018年07月10日(火)

代数幾何学セミナー

15:30-17:00 数理科学研究科棟(駒場) 002号室
いつもと部屋が違います。The room is different from usual.
賴青瑞氏 (国立成功大学)
TBA (English)

[ 講演概要 ]
TBA

講演会

15:00-16:00 数理科学研究科棟(駒場) 128号室
Sam Nariman 氏 (Northwestern University)
On the moduli space of flat symplectic surface bundles

[ 講演概要 ]
There are at least three different approaches to construct characteristic invariants of flat symplectic bundles. Reznikov generalized Chern-Weil theory for finite dimension Lie groups to the infinite dimensional group of symplectomorphisms. He constructed nontrivial invariants of symplectic bundles whose fibers are diffeomorphic to complex projective spaces. Kontsevich used formal symplectic geometry to build interesting classes that are not yet known to be nontrivial. Also for surface bundles whose holonomy groups preserve the symplectic form, Kotschick and Morita used the flux homomorphism to construct many nontrivial stable classes.

In this talk, we introduce infinite loop spaces whose cohomolgy groups describe the stable characteristic invariants of symplectic flat surface bundles. As an application, we give a homotopy theoretic description of
Kotschick and Morita's classes and prove a result about codimension 2 foliations that implies the nontriviality of KM classes.

トポロジー火曜セミナー

17:00-18:30 数理科学研究科棟(駒場) 056号室
Tea: Common Room 16:30-17:00
Emmy Murphy 氏 (Northwestern University)
Loose Legendrians and arboreal singularities (ENGLISH)

[ 講演概要 ]
Given a Stein manifold X, under what conditions can we ensure that X is symplectomorphic to C^n? For n>2 the condition of X being diffeomorphic to C^n does not suffice, and many counterexamples have been constructed which are detected by symplectic cohomology and the Fukaya category. One might conjecture that the diffeomorphism type together with a vanishing Fukaya category characterizes C^n. While this question is currently well of of reach, we present some new partial results. The main tools we'll discuss are arboreal singularities, constructable sheaf theory, and loose Legendrians -- and how they fit together to approach this question.

数値解析セミナー

16:50-18:20 数理科学研究科棟(駒場) 126号室
松本純一氏 (産業技術総合研究所)
直交基底気泡関数有限要素法による自由表面流れ
(Japanese)

[ 講演概要 ]
非構造格子（三角形と四面体）に適用が可能な直交基底気泡関数要素による有限要素法を用いた2次元浅水流れと3次元気液二相流れについて解説する。2次元浅水流れでは、浅水長波方程式とBoussinesq方程式おける数値安定性を考慮した陽的および陰的有限要素法について説明する。計算例として、浅水長波方程式では風応力を考慮した自由表面問題および河床摩擦を考慮した跳水現象の厳密解との比較、波の分散を考慮したBoussinesq方程式では孤立波の近似解および実験結果と計算結果との比較を示す。3次元気液二相流れでは、界面関数を扱うPhase-FieldモデルとしてAllen-Cahn方程式、Cahn-Hilliard方程式の双方を取り上げ、Navier-Stokes方程式とPhase-Field界面モデルを採用した直交基底気泡関数要素安定化法について解説する。さらに、2次元（2D）浅水流れと3次元（3D）気液二相流れにおける双方向の流れを考慮した結合法について述べ2D-3D連成問題について計算例を示す。

2018年07月11日(水)

作用素環セミナー

16:45-18:15 数理科学研究科棟(駒場) 126号室
George Elliott 氏 (Univ. Toronto)
Recent progress in the classification of amenable C*-algebras (cont'd)

2018年07月13日(金)

談話会・数理科学講演会

15:30-16:30 数理科学研究科棟(駒場) 056号室
DINH Tien Cuong 氏 (National University of Singapore )
Pluripotential theory and complex dynamics in higher dimension

[ 講演概要 ]
Positive closed currents, the analytic counterpart of effective cycles in algebraic geometry, are central objects in pluripotential theory. They were introduced in complex dynamics in the 1990s and become now a powerful tool in the field. Challenging dynamical problems involve currents of any dimension. We will report recent developments on positive closed currents of arbitrary dimension, including the solutions to the regularization problem, the theory of super-potentials and the theory of densities. Applications to dynamics such as properties of dynamical invariants (e.g. dynamical degrees, entropies, currents, measures), solutions to equidistribution problems, and properties of periodic points will be discussed.

2018年07月17日(火)

トポロジー火曜セミナー

17:00-18:30 数理科学研究科棟(駒場) 056号室
Tea: Common Room 16:30-17:00
石川昌治氏 (慶應義塾大学)
Positive flow-spines and contact 3-manifolds (JAPANESE)

[ 講演概要 ]
A contact structure is a smooth distribution of hyperplanes on an odd-dimensional manifold that is non-integrable everywhere. In the case of dimension 3, there is a nice relationship between open book decompositions of 3-manifolds and contact structures up to contactomorphisms, called Giroux correspondence. A flow-spine is a spine of a 3-manifold admitting a flow such that it is transverse to the spine and the flow in the complement of the spine is diffeomorphic to a constant flow in an open ball. In this talk, we introduce some results in progress that give a correspondence between contact structures and positive flow-spines by regarding Reeb vector fields as flows of spines. This is a joint work with Y. Koda (Hiroshima) and H. Naoe (Tohoku).

2018年07月18日(水)

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
普段と違う水曜日にセミナーを行います。The seminar will be held on Wednesday. This is a different day from usual.
Jun-Muk Hwang 氏 (KIAS)
Normal Legendrian singularities (English)

[ 講演概要 ]
A germ of a Legendrian subvariety in a holomorphic contact manifold
is called a Legendrian singularity. Legendrian singularities are usually not normal.
We look at some examples of normal Legendrian singularities and discuss their rigidity under deformation.