Effects of layer interactions on instantaneous stability of finite Stokes flows  

作　　者：Chen ZHAO Zhenli CHEN C.T.MUTASA Dong LI 

机构地区：[1]School of Aeronautics,Northwestern Polytechnical University,Xi'an 710072,China

出　　处：《Applied Mathematics and Mechanics(English Edition)》2024年第1期69-84,共16页应用数学和力学（英文版）

基　　金：Project supported by the National Natural Science Foundation of China (No. 11402211)。

摘　　要：The stability analysis of a finite Stokes layer is of practical importance in flow control. In the present work, the instantaneous stability of a finite Stokes layer with layer interactions is studied via a linear stability analysis of the frozen phases of the base flow. The oscillations of two plates can have different velocity amplitudes, initial phases, and frequencies. The effects of the Stokes-layer interactions on the stability when two plates oscillate synchronously are analyzed. The growth rates of two most unstable modes when δ < 0.12 are almost equal, and δ = δ*/h*, where δ*and h*are the Stokes-layer thickness and the half height of the channel, respectively. However, their vorticities are different. The vorticity of the most unstable mode is symmetric, while the other is asymmetric. The Stokes-layer interactions have a destabilizing effect on the most unstable mode when δ < 0.68, and have a stabilizing effect when δ > 0.68. However, the interactions always have a stabilizing effect on the other unstable mode. It is explained that one of the two unstable modes has much higher dissipation than the other one when the Stokes-layer interactions are strong. We also find that the stability of the Stokes layer is closely related to the inflectional points of the base-flow velocity profile. The effects of inconsistent velocity-amplitude, initial phase, and frequency of the oscillations on the stability are analyzed. The energy of the most unstable eigenvector is mainly distributed near the plate of higher velocity amplitude or higher oscillation frequency. The effects of the initial phase difference are complicated because the base-flow velocity is extremely sensitive to the initial phase.

关 键 词：finite Stokes layer instantaneous stability Stokes-layer interaction asynchronous oscillation 

分 类 号：O357.41[理学—流体力学]