九州関数方程式セミナー 平成27年度前期講演

日時 7月3日(金) 15:30--17:00
会場 福岡大学 セミナーハウス 2階 セミナー室
講師 井口 達雄 氏 (慶應義塾大学)
題目 Solvability of the initial value problem to a model system for water waves
概要 The water wave problem is mathematically formulated as a free boundary problem for an irrotational flow of an inviscid and incompressible fluid under the gravitational field. It is well-known that the water wave problem has a variational structure. In fact, J. C. Luke (1967) gave a Lagrangian in terms of the velocity potential and the surface variation. M. Isobe (1994) and T. Kakinuma (2000) derived model equations for water waves and the model equations are the Euler-Lagrange equations to an approximated Lagrangian, which is obtained by approximating the velocity potential in Luke's Lagrangian. In this talk, we consider one of the model equations and report the structure of the model and the solvability of the initial value problem.

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