The effect of conductor boundaries on the deformation and stability of a charged drop is presented. The motivation for such a study is the occurrence of a charged conductor drop near a conductor wall in experiments (Millikan-like set-up in studies on Rayleigh break-up) and applications (such as electrospraying, ink-jet printing and ion mass spectroscopy). In the present work, analytical (linear stability analysis (LSA)) and numerical methods (boundary element method (BEM)) are used to understand the instability. Two kinds of boundaries are studied: a spherical, conducting, grounded enclosure (similar to a spherical capacitor) and a planar conducting wall. The LSA of a charged drop placed at the center of a spherical cavity shows that the Rayleigh critical charge (corresponding to the most unstable l = 2 Legendre mode) is reduced as the non-dimensional distance ? d = ba a decreases, where a and b are the radii of the drop and spherical cavity, respectively. The critical charge is independent of the assumptions of constant charge or constant potential conditions. The trans-critical bifurcation diagram, constructed using BEM, shows that the prolate shapes are subcritically unstable over a much wider range of charge as ? d decreases. The study is then extended to the stability of a charged conductor drop near a flat conductor wall. Analytical theory for this case is difficult and the stability as well as the bifurcation diagram are constructed using BEM. Moreover, the induced charges in the conductor wall lead to attraction of the drop to the wall, thereby making it difficult to conduct a systematic analysis. The drop is therefore assumed to be held at its position by an external force such as the electric field. The case when the applied field is much smaller than the field due to inherent charge on the drop (a3-g 30-2 1) is considered. The wall breaks the fore-aft symmetry in the problem, and equilibrium, predominantly prolate shapes corresponding to the legendre mode, l = 2, are observed. The deformation increases with increasing charge on the drop. The breakup of the prolate equilibrium shapes is independent of the legendre modes of the initial perturbations. The prolate perturbations are subcritically unstable. Since the equilibrium prolate shapes cannot continuously exchange instability with equilibrium oblate shapes, an imperfect transcritical bifurcation is observed. A variety of highly deformed equilibrium oblate shapes are predicted by the BEM calculations.
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机译:提出了导体边界对带电液滴的变形和稳定性的影响。进行此类研究的动机是,在实验(瑞利破裂研究中的Millikan装置)和应用(例如电喷雾,喷墨印刷和离子质谱法)中,在导体壁附近会出现带电导体掉落的现象。 )。在当前的工作中,使用分析(线性稳定性分析(LSA))和数值方法(边界元方法(BEM))来了解不稳定性。研究了两种边界:球形,导电,接地的外壳(类似于球形电容器)和平面导电壁。放置在球腔中心的带电液滴的LSA显示,随着无量纲距离?的减小,瑞利临界电荷(对应于最不稳定的l = 2 Legendre模式)减小了。 d = ba a减小,其中a和b分别是液滴的半径和球形腔的半径。临界电荷与恒定电荷或恒定电势条件的假设无关。使用BEM构造的跨临界分叉图表明,扁长的形状在更大的电荷范围内是亚临界不稳定的,因为? d减小。然后将研究扩展到扁平导体壁附近带电导体降落的稳定性。这种情况的分析理论很困难,并且使用BEM构造了稳定性以及分叉图。而且,导体壁中的感应电荷导致液滴吸引到壁上,从而使得难以进行系统的分析。因此,假设液滴通过诸如电场的外力保持在其位置。考虑由于液滴的固有电荷(a3-g 30-2 1)而导致的施加场远小于场的情况。墙破坏了该问题的前后对称,并且观察到了平衡,主要是对应于勒让德模式的扁长形状,l = 2。变形随着液滴上电荷的增加而增加。扁长的平衡形状的破裂与初始扰动的勒让德模式无关。扁长摄动是亚临界不稳定的。由于平衡扁长形状不能与平衡扁长形状连续交换不稳定性,因此观察到不完美的跨临界分叉。 BEM计算可预测各种高度变形的平衡扁圆形状。
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