Berti S, Boffetta G
Laboratoire de Spectrométrie Phyisque, Grenoble, UJF-CNRS, UMR5588, France.
Phys Rev E Stat Nonlin Soft Matter Phys. 2010 Sep;82(3 Pt 2):036314. doi: 10.1103/PhysRevE.82.036314. Epub 2010 Sep 17.
We investigate the dynamics of the two-dimensional periodic Kolmogorov flow of a viscoelastic fluid, described by the Oldroyd-B model, by means of direct numerical simulations. Above a critical Weissenberg number the flow displays a transition from stationary to randomly fluctuating states, via periodic ones. The increasing complexity of the flow in both time and space at progressively higher values of elasticity accompanies the establishment of mixing features. The peculiar dynamical behavior observed in the simulations is found to be related to the appearance of filamental propagating patterns, which develop even in the limit of very small inertial nonlinearities, thanks to the feedback of elastic forces on the flow.
我们通过直接数值模拟研究了由Oldroyd - B模型描述的粘弹性流体二维周期柯尔莫哥洛夫流的动力学特性。在临界魏森贝格数以上,流动通过周期性状态从静止状态转变为随机波动状态。随着弹性值逐渐增大,流动在时间和空间上的复杂性增加,同时伴随着混合特征的形成。模拟中观察到的特殊动力学行为被发现与丝状传播模式的出现有关,由于弹性力对流动的反馈,即使在非常小的惯性非线性极限情况下,这些模式也会发展。
