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表紙・目次
(2011-05)
数理解析研究所講究録, 1740
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Generalized minimal surfaces in Minkowski spaces (Progress in Variational Problems : New Trends of Geometric Gradient Flow and Critical Point Theory)
Novaga, Matteo (2011-05)
数理解析研究所講究録, 1740: 1-10
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Gradient Flow for the Helfrich Variational Problem (Progress in Variational Problems : New Trends of Geometric Gradient Flow and Critical Point Theory)
Nagasawa, Takeyuki (2011-05)
数理解析研究所講究録, 1740: 11-23
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On evolving hypersurfaces with boundaries by mean curvature flow (Progress in Variational Problems : New Trends of Geometric Gradient Flow and Critical Point Theory)
Kohsaka, Yoshihito (2011-05)
数理解析研究所講究録, 1740: 24-36
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Various gradient flows in the plane : modeling, applications and polygonal analogues (Progress in Variational Problems : New Trends of Geometric Gradient Flow and Critical Point Theory)
Yazaki, Shigetoshi (2011-05)
数理解析研究所講究録, 1740: 37-51
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Existence and non-existence for nonlinear Schrodinger equations (Progress in Variational Problems : New Trends of Geometric Gradient Flow and Critical Point Theory)
Sato, Yohei (2011-05)
数理解析研究所講究録, 1740: 52-63
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A NEW APPROACH TO LIOUVILLE THEOREMS FOR ELLIPTIC INEQUALITIES (Progress in Variational Problems : New Trends of Geometric Gradient Flow and Critical Point Theory)
ARMSTRONG, SCOTT N.; SIRAKOV, BOYAN (2011-05)
数理解析研究所講究録, 1740: 64-73
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A new two-phase fluid problem with surface energy (Progress in Variational Problems : New Trends of Geometric Gradient Flow and Critical Point Theory)
Tonegawa, Yoshihiro (2011-05)
数理解析研究所講究録, 1740: 74-88
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THE METHOD OF NEHARI MANIFOLD REVISITED (Progress in Variational Problems : New Trends of Geometric Gradient Flow and Critical Point Theory)
SZULKIN, ANDRZEJ (2011-05)
数理解析研究所講究録, 1740: 89-102
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Dual variational approach to a quasilinear Schrodinger equation arising in plasma physics (Progress in Variational Problems : New Trends of Geometric Gradient Flow and Critical Point Theory)
Adachi, Shinji; Watanabe, Tatsuya (2011-05)
数理解析研究所講究録, 1740: 103-119
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A note on the asymptotic formula for solutions of the linealized Gel'fand problem (Progress in Variational Problems : New Trends of Geometric Gradient Flow and Critical Point Theory)
Ohtsuka, Hiroshi (2011-05)
数理解析研究所講究録, 1740: 120-140
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On the attainability for the best constant of the Sobolev-Hardy type inequality (Progress in Variational Problems : New Trends of Geometric Gradient Flow and Critical Point Theory)
Lin, Chang-Shou; Wadade, Hidemitsu (2011-05)
数理解析研究所講究録, 1740: 141-157
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A SEMILINEAR SCHRODINGER EQUATION WITH AHARONOV-BOHM MAGNETIC POTENTIAL (Progress in Variational Problems : New Trends of Geometric Gradient Flow and Critical Point Theory)
SZULKIN, ANDRZEJ (2011-05)
数理解析研究所講究録, 1740: 158-166
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MULTIPLE SIGN-CHANGING SOLUTIONS FOR AN ASYMPTOTICALLY LINEAR ELLIPTIC PROBLEM (Progress in Variational Problems : New Trends of Geometric Gradient Flow and Critical Point Theory)
SHIOJI, NAOKI (2011-05)
数理解析研究所講究録, 1740: 167-175
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