No.1779
変分問題の展開 - 発展方程式論における変分的方法
Progress in Variational Problems - Variational Methods in the Study of Evolution Equations
RIMS 研究集会報告集
  
2011/06/06〜2011/06/08
高橋 太
Futoshi Takahashi
 
目 次
 
1. Existence and non-existence results of the Fucik type spectrum for the generalized $p$-Laplace operators (Progress in Variational Problems : Variational Methods in the Study of Evolution Equations)---1
    東京理科大学理学部第二部数学科   田中 視英子 (Tanaka,Mieko)
 
2. Stable and unstable solutions to Laplace equations with nonlinear boundary conditions (Progress in Variational Problems : Variational Methods in the Study of Evolution Equations)---11
    早稲田大学理工学術院先進理工学部   原田 潤一 (Harada,Junichi)
 
3. Asymptotic stability of stationary solutions to degenerate Keller-Segel systems in sub-critical cases (Progress in Variational Problems : Variational Methods in the Study of Evolution Equations)---20
    大阪市立大学理学研究科 / 津田塾大学   杉山 由恵 / 矢作 由美 (SUGIYAMA,Yoshie / YAHAGI,Yumi)
 
4. 結晶粒界現象に関連する1次元フェーズ・フィールドモデル (変分問題の展開 : 発展方程式論における変分的方法)--------------------------27
    千葉大学教育学部 / サレジオ工業高等専門学校一般教育科 / 神奈川大学工学部   白川 健 / 渡邉 紘 / 山崎 教昭 (Shirakawa,Ken / Watanabe,Hiroshi / Yamazaki,Noriaki)
 
5. Heat equation with a singular potential on the boundary and the trace-Hardy inequality (Progress in Variational Problems : Variational Methods in the Study of Evolution Equations)---52
    東北大学大学院理学研究科 / 福島大学共生システム理工学類   石毛 和弘 / 石渡 通徳 (Ishige,Kazuhiro / Ishiwata,Michinori)
 
6. REGULARITY THEORY AND ASYMPTOTIC BEHAVIORS IN THE INTEGRO-DIFFERENTIAL EQUATIONS (Progress in Variational Problems : Variational Methods in the Study of Evolution Equations)---69
    INSTITUTE OF MATHEMATICS, ACADEMIA SINICA / DEPARTMENT OF MATHEMATICS EDUCATION, KOREA UNIVERSITY / SEOUL NATIONAL UNIVERSITY   KIM,SUNGHOON / KIM,YONG-CHEOL / LEE,KI-AHM
 
7. Global dynamics beyond the ground state energy for nonlinear wave equations (Progress in Variational Problems : Variational Methods in the Study of Evolution Equations)---88
    京都大学理学研究科   中西 賢次 (Nakanishi,Kenji)
 
8. Transversality of Stable and Nehari Manifolds for a Semilinear Heat Equation (Progress in Variational Problems : Variational Methods in the Study of Evolution Equations)---91
    東京学芸大学・JST   溝口 紀子 (Mizoguchi,Noriko)
 
9. Collapsing behaviour of the logarithmic diffusion equation (Progress in Variational Problems : Variational Methods in the Study of Evolution Equations)---98
    Institute of Mathematics, Academia Sinica   Hui,Kin Ming
 
10. Profiles of solutions to an integral system related to the weighted Hardy-Littlewood-Sobolev inequality (Progress in Variational Problems : Variational Methods in the Study of Evolution Equations)---111
    東北大学大学院理学研究科   小野寺 有紹 (Onodera,Michiaki)
 
11. Properties of a least-energy solution to a semilinear elliptic equation with exponential nonlinearity (Progress in Variational Problems : Variational Methods in the Study of Evolution Equations)---128
    大阪府立大学工学研究科   小坂 篤志 (Kosaka,Atsushi)
 
12. THE PHRAGMEN-LINDELOF THEOREM FOR $L^p$-VISCOSITY SOLUTIONS (Progress in Variational Problems : Variational Methods in the Study of Evolution Equations)---140
    東北大学理学研究科   中川 和重 (NAKAGAWA,KAZUSHIGE)