Japanese Page
Viscosity Solutions of Differential Equations and Related Topics
Period: June 24-26, 2009
RIMS
, Kyoto University
How to get RIMS
Organizers
Hitoshi Ishii (Chair, Waseda University, hitoshi.ishii at waseda.jp )
Yoshikazu Giga (University of Tokyo)
Shigeo Koike (Saitama University)
Program (Click for abstract; also
a collection of abstracts
will be available)
June 24 (Wednesday)
13:40--14:30
Y. Fujita (Univ Toyama)
:
On Hamilton-Jacobi equations and Euclidean logarithmic Sobolev inequality
14:40--15:30
G. Nakamura (Waseda Univ)
:
Integral equations and approximation of p-Laplace equations
16:00--16:50
G. Akagi (Shibaura Inst Tech)
:
A random walk model for nonlinear diffusion
June 25(Thursday)
9:30--10:20
W. Gangbo (Georgia Inst Tech)
:
Lagrangian dynamics on an infinite-dimensional torus
10:30--11:20
T. Mikami (Hiroshima Univ)
:
A remark on the Knothe-Rosenblatt type rearrangement and its stochastic version
11:40--12:30
Q. Liu (Univ Tokyo)
:
On the game-theoretic approach to motion by curvature with Neumann boundary condition
Lunch
13:40--14:30
N. Nadirashvili (Univ Provence)
:
Singular solutions to fully nonlinear elliptic equations
14:40--15:30
A. Siconolfi (Sapienza Univ Roma)
:
Qualitative analysis of critical stationary ergodic Hamilton-Jacobi equations
16:00--16:50
E. Yanagida (Tohoku Univ)
:
Minimization of the principal eigenvalue for an elliptic boundary value problem with indefinite weight
18:30--
Reception
June 26 (Friday)
9:30--10:20
Y. Giga (Univ Tokyo)
:
Motion by nonlocal curvature and Hamilton-Jacobi equations with unusual free boundary
10:30--11:20
H. Morimoto (Ehime Univ)
:
Variational inequalities with gradient constraint and applications to optimal dividend payments
11:40--12:30
T. Kato (Mitsubishi UFJ Trust Investment Technology Institute Co., Ltd.)
:
Optimal execution problem with market impact
Lunch
13:30--14:20
J.-M. Roquejoffre (Univ Paul Sabatier)
:
Non-local minimal surfaces
14:30--15:20
S. Koike (Saitama Univ)
:
Weak Harnack inequality for fully nonlinear PDEs with superlinear growth terms in Du