On an existence theory for a fluid-beam problem encompassing possible contacts

Jean-J'erome Casanova, C. Grandmont, M. Hillairet
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引用次数: 12

Abstract

In this paper we consider a coupled system of pdes modelling the interaction between a two-dimensional incompressible viscous fluid and a one-dimensional elastic beam located on the upper part of the fluid domain boundary. We design a functional framework to define weak solutions in case of contact between the elastic beam and the bottom of the fluid cavity. We then prove that such solutions exist globally in time regardless a possible contact by approximating the beam equation by a damped beam and letting this additional viscosity vanishes.
含可能接触的流束问题的存在性理论
本文考虑了二维不可压缩粘性流体与位于流体域边界上端的一维弹性梁之间相互作用的偏微分方程耦合系统。我们设计了一个函数框架来定义弹性梁与流体腔底接触时的弱解。然后,我们通过用阻尼梁近似梁方程并让这个附加粘度消失,证明了这种解在时间上全局存在,而不管可能的接触。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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