To English version
Date and time :
November 23 (Thrs, Holiday) 10:00 –
November 25 (Sat) 17:00, 2017
Place :
H213, Ookayama Campus, Tokyo Institute of
Technology
東京工業大学大岡山キャンパス 本館213号室
Program :
November 23 (Thrs)
10:00-11:00 Nicholas Edelen (MIT) : Convexity estimates for free-boundary mean
curvature flow
11:00-11:30 Break
11:30-12:30 Haozhao Li (University of Science and Technology of China) :
The extension problem of mean curvature flow
12:30-14:00 Break
14:00-14:30 Discussion Time
14:30-15:30 Keita Kunikawa (Tohoku University) : Convergence of generalized
Lagrangian mean curvature flow in Fano manifolds
15:30-16:00 Break
16:00-17:00 Lami Kim (Tokyo Institute of Technology) : On the mean curvature flow of
grain boundaries
November 24 (Fri)
10:00-11:00 Felix Schulze (University College London) : Existence of Brakke flow
solutions from surface clusters via elliptic regularisation
11:00-11:30 Break
11:30-12:30 Knut Smoczyk (University of Hannover) : Mean curvature flow of maps
between Riemannian manifolds, Part 1
12:30-14:00 Break
14:00-14:30 Discussion Time
14:30-15:30 Nicholas Edelen (MIT) : The free-boundary Brakke flow
15:30-16:00 Break
16:00-17:00 Haozhao Li (University of Science and Technology of China) : Regularity
scales and convergence of the Calabi flow
18:00 – Dinner Party
November 25 (Sat)
10:00-11:00 Felix Schulze (University College London) : Optimal isoperimetric
inequalities for surfaces in any codimension in Cartan-Hadamard manifolds
11:00-11:30 Break
11:30-12:30 : Knut Smoczyk (University of Hannover) : Mean curvature flow of maps
between Riemannian manifolds, Part 2
12:30-14:00 Break
14:00-14:30 Discussion Time
14:30-15:30 Hikaru Yamamoto (Tokyo University of Science) : Ricci-mean curvature
flows and its Gauss maps
15:30-16:00 Break
16:00-17:00 Keisuke Takasao (Kyoto University) : Phase field method and
monotonicity formula for the volume preserving mean curvature flow
プログラム(PDF) アブストラクト(PDF)
組織委員
利根川 吉廣 (東京工業大学)
小池 直之 (東京理科大学)
本研究集会は
科学研究費補助金・基盤研究(A)No. 25247008
科学研究費補助金・基盤研究(S)No. 26220702
によってサポートされています。