Uniqueness and regularity for the Navier-Stokes-Cahn-Hilliard system
保存先:
| 出版年: | arXiv.org (Dec 9, 2024), p. n/a |
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| 第一著者: | |
| その他の著者: | , |
| 出版事項: |
Cornell University Library, arXiv.org
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| 主題: | |
| オンライン・アクセス: | Citation/Abstract Full text outside of ProQuest |
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| 抄録: | The motion of two contiguous incompressible and viscous fluids is described within the diffuse interface theory by the so-called Model H. The system consists of the Navier-Stokes equations, which are coupled with the Cahn-Hilliard equation associated to the Ginzburg-Landau free energy with physically relevant logarithmic potential. This model is studied in bounded smooth domain in R^d, d=2 and d=3, and is supplemented with a no-slip condition for the velocity, homogeneous Neumann boundary conditions for the order parameter and the chemical potential, and suitable initial conditions. We study uniqueness and regularity of weak and strong solutions. In a two-dimensional domain, we show the uniqueness of weak solutions and the existence and uniqueness of global strong solutions originating from an initial velocity u_0 in V, namely u_0 in H_0^1 such that div u_0=0. In addition, we prove further regularity properties and the validity of the instantaneous separation property. In a three-dimensional domain, we show the existence and uniqueness of local strong solutions with initial velocity u_0 in V. |
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| ISSN: | 2331-8422 |
| ソース: | Engineering Database |