A. I. Grigor’ev, S. O. Shiryaeva, V. A. Koromyslov
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引用次数: 0
Abstract
The physical regularities of implementing the electrostatic instability of a flat charged surface of a noncompressible viscous conducting liquid are considered for the case of a pool of finite dimensions where the spectrum of emerging capillary waves is discrete. The critical conditions for the onset of the electrostatic instability of an uncompressible viscous conductive liquid in a pool of finite dimensions are shown to coincide with those for a boundless surface of an infinitely deep ideal uncompressible liquid (coincide with the conditions for implementing Tonks–Frenkel instability). This makes it possible to experimentally verify the criterion for implementing Tonks–Frenkel instability using pools of finite dimensions without introducing qualitative errors.
期刊介绍:
Fluid Dynamics is an international peer reviewed journal that publishes theoretical, computational, and experimental research on aeromechanics, hydrodynamics, plasma dynamics, underground hydrodynamics, and biomechanics of continuous media. Special attention is given to new trends developing at the leading edge of science, such as theory and application of multi-phase flows, chemically reactive flows, liquid and gas flows in electromagnetic fields, new hydrodynamical methods of increasing oil output, new approaches to the description of turbulent flows, etc.