中文

The Shape and Stability of a Viscous Thread

流体动力学 2009-11-10 v1

摘要

When a viscous fluid, like oil or syrup, streams from a small orifice and falls freely under gravity, it forms a long slender thread, which can be maintained in a stable, stationary state with lengths up to several meters. We shall discuss the shape of such liquid threads and their surprising stability. It turns out that the strong advection of the falling fluid can almost outrun the Rayleigh-Plateau instability. Even for a very viscous fluid like sirup or silicone oil, the asymptotic shape and stability is independent of viscosity and small perturbations grow with time as exp(Ct1/4)\exp({{\rm C} t^{{1/4}}}), where the constant is independent of viscosity. The corresponding spatial growth has the form exp((z/L)1/8)\exp({(z/L)^{{1/8}}}), where zz is the down stream distance and LQ2σ2gL \sim Q^2 \sigma^{-2} g and where σ\sigma is the surface tension, gg is the gravity and QQ is the flux. However, the value of viscosity determines the break-up length of a thread Lνν1/4L_{\nu} \sim \nu^{1/4} and thus the possibility of observing the exp(Ct1/4)\exp({{\rm C} t^{{1/4}}}) type asymptotics.

关键词

引用

@article{arxiv.physics/0402130,
  title  = {The Shape and Stability of a Viscous Thread},
  author = {Sergey Senchenko and Tomas Bohr},
  journal= {arXiv preprint arXiv:physics/0402130},
  year   = {2009}
}

备注

7 pages, 2 figures