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過去の記録 ~04/25|次回の予定|今後の予定 04/26~
| 開催情報 | 木曜日 16:00~17:30 数理科学研究科棟(駒場) 002号室 |
|---|---|
| 担当者 | 石毛 和弘 |
2017年12月21日(木)
16:00-17:30 数理科学研究科棟(駒場) 128号室
森洋一朗 氏 (ミネソタ大学)
Well-posedness and qualitative behavior of Peskin's problem of an immersed elastic filament in 2D Stokes flow
(Japanese)
森洋一朗 氏 (ミネソタ大学)
Well-posedness and qualitative behavior of Peskin's problem of an immersed elastic filament in 2D Stokes flow
(Japanese)
[ 講演概要 ]
A prototypical fluid-structure interaction (FSI) problem is that of a closed elastic filament immersed in 2D Stokes flow, where the fluids inside and outside the closed filament have equal viscosity. This problem was introduced in the context of Peskin's immersed boundary method, and is often used to test computational methods for FSI problems. Here, we study the well-posedness and qualitative behavior of this problem.
We show local existence and uniqueness with initial configuration in the Holder space C^{1,\alpha}, 0<\alpha<1, and show furthermore that the solution is smooth for positive time. We show that the circular configurations are the only stationary configurations, and show exponential asymptotic stability with an explicit decay rate. Finally, we identify a scalar quantity that goes to infinity if and only if the solution ceases to exist. If this quantity is bounded for all time, we show that the solution must converge exponentially to a circle.
This is joint work with Analise Rodenberg and Dan Spirn.
A prototypical fluid-structure interaction (FSI) problem is that of a closed elastic filament immersed in 2D Stokes flow, where the fluids inside and outside the closed filament have equal viscosity. This problem was introduced in the context of Peskin's immersed boundary method, and is often used to test computational methods for FSI problems. Here, we study the well-posedness and qualitative behavior of this problem.
We show local existence and uniqueness with initial configuration in the Holder space C^{1,\alpha}, 0<\alpha<1, and show furthermore that the solution is smooth for positive time. We show that the circular configurations are the only stationary configurations, and show exponential asymptotic stability with an explicit decay rate. Finally, we identify a scalar quantity that goes to infinity if and only if the solution ceases to exist. If this quantity is bounded for all time, we show that the solution must converge exponentially to a circle.
This is joint work with Analise Rodenberg and Dan Spirn.
