RIMS Kôkyûroku
No.1837
•ฯ•ช–โ‘่‚ฬ“WŠJ|Šm—ฆ˜_‚ฦŒ๐๖‚ท‚้•ฯ•ช–โ‘่
Progress in Variational Problems - Variational Problems Interacting with Probability Theories
RIMS Œค‹†W‰๏•๑W
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2012/06/11`2012/06/13
‚‹ด@‘พ
Futoshi Takahashi
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–ฺ@ŽŸ
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1. Trudinger-Moser inequality for point vortex mean field limit with multi-intensities (Progress in Variational Problems : Variational Problems Interacting with Probability Theories)---1
@@@@‘ๅใ‘ๅŠwŠ๎‘bHŠwŒค‹†‰ศ / ‘ๅใ‘ๅŠwŠ๎‘bHŠwŒค‹†‰ศ@@@—้–ุ ‹M / ZHANG XIAO@(SUZUKI,TAKASHI / ZHANG,XIAO)
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2. Relationship between quantum walks and differential equations (Progress in Variational Problems : Variational Problems Interacting with Probability Theories)---21
@@@@–พŽก‘ๅŠwŒค‹†E’mเํ—ช‹@\@@@’ฌ“c ‘๑–็@(Machida,Takuya)
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3. Partial Differential Equations Arising from the Chern-Simons Gauged $O(3)$ Sigma Model (Progress in Variational Problems : Variational Problems Interacting with Probability Theories)---29
@@@@Department of Mathematics, Kyung Hee University@@@Han,Jongmin
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4. Curvature-dimension condition and heat flow on metric measure spaces (Progress in Variational Problems : Variational Problems Interacting with Probability Theories)---44
@@@@‹ž“s‘ๅŠw—ŠwŒค‹†‰ศ@@@‘พ“c Tˆ๊@(Ohta,Shin-ichi)
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5. A GRADIENT FLOW APPROACH TO THE KELLER-SEGEL SYSTEMS (Progress in Variational Problems : Variational Problems Interacting with Probability Theories)---52
@@@@TSE(GREMAQ, CNRS UMR 5604, INRA UMR 1291, UNIVERSITE DE TOULOUSE)@@@BLANCHET,ADRIEN
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6. Stochastic optimal transportation problem and related topics (Progress in Variational Problems : Variational Problems Interacting with Probability Theories)---74
@@@@L“‡‘ๅŠwHŠwŒค‹†‰@@@@ŽOใ •q•v@(Mikami,Toshio)
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7. ON NON-LINEAR SPECTRAL GAP FOR SYMMETRIC MARKOV CHAINS WITH COARSE RICCI CURVATURES (Progress in Variational Problems : Variational Problems Interacting with Probability Theories)---87
@@@@ / ŒF–{‘ๅŠwŽฉ‘R‰ศŠwŒค‹†‰ศ@@@ฌŒE ‰f‹P / ŒK] ˆ๊—m@(KOKUBO,EIKI / KUWAE,KAZUHIRO)
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8. Long time asymptotic problems for stochastic optimal control and related variational problems (Progress in Variational Problems : Variational Problems Interacting with Probability Theories)---102
@@@@L“‡‘ๅŠwHŠwŒค‹†‰@@@@ŽsŒด ’ผK@(Ichihara,Naoyuki)
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9. Tunneling for spatially cut-off $P(\phi)_2$-Hamiltonians (Progress in Variational Problems : Variational Problems Interacting with Probability Theories)---114
@@@@“Œ–k‘ๅŠw—ŠwŒค‹†‰ศ@@@‰๏“c –ฮŽ๗@(Aida,Shigeki)
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10. A stability estimate and numerical curiosities related to the flow of a curve by its binormal curvature (Progress in Variational Problems : Variational Problems Interacting with Probability Theories)---119
@@@@Universite Pierre & Marie Curie@@@Smets,Didier
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11. Hardy type inequalities with scale invariance in limiting cases (Progress in Variational Problems : Variational Problems Interacting with Probability Theories)---132
@@@@ˆค•Q‘ๅŠw‘ๅŠw‰@—HŠwŒค‹†‰ศ@@@’–‰œ —ฯถ@(Ioku,Norisuke)
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12. Semilinear elliptic equations in symmetric domains (Progress in Variational Problems : Variational Problems Interacting with Probability Theories)---142
@@@@ฒ‰๊‘ๅŠw—HŠw•”@@@Š–ุ‰ฎ —ดŽก@(Kajikiya,Ryuji)
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