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1

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Hysteresis in forced oscillations of pendant drops (1995)

DePaoli, D. W. ; Feng, J. Q. ; Basaran, O. A. ; [et al.]

[S.l.] : American Institute of Physics (AIP)

Physics of Fluids 7 (1995), S. 1181-1183

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ISSN: 1089-7666

Source: AIP Digital Archive

Topics: Physics

Notes: A hysteresis phenomenon has been revealed through experiments conducted with large-amplitude forced oscillations of pendant drops in air. Under strong excitation, the frequency response of a drop forced at constant amplitude exhibits jump behavior; a larger peak response amplitude ε↓ appears at a lower frequency ω↓ during a downward (↓) variation of forcing frequency than during an upward (↑) variation, viz. ε↓(approximately-greater-than)ε↑ and ω↓〈ω↑. Similar results are obtained when forcing amplitude is varied at constant frequency. This behavior is characteristic of a system with a soft nonlinearity. These findings indicate that oscillating pendant drops constitute a convenient system for studying nonlinear dynamics. © 1995 American Institute of Physics.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1063/1.868576

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Axisymmetric shapes and stability of isolated charged drops (1989)

Basaran, O. A. ; Scriven, L. E.

New York, NY : American Institute of Physics (AIP)

Physics of Fluids 1 (1989), S. 795-798

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ISSN: 1089-7666

Source: AIP Digital Archive

Topics: Physics

Notes: Axisymmetric equilibrium shapes and stability of isolated charged drops are found by solving simultaneously the Young–Laplace equation for surface shape and the Laplace equation for the electric field. Families of two-, three-, and four-lobed shapes that branch from the trunk family of spheres are treated systematically by means of the Galerkin/finite element method and a tessellation that deforms with the free surface. The results show that at the limit found by Rayleigh in 1882 the spherical family exchanges stability with a family of two-lobed shapes, a transcritically bifurcating family, one arm of which proves to consist of stable shapes. The results are reinforced by those of approximating the stable drop shapes as oblate spheroids. Thus oblate drops carrying charge in excess of the Rayleigh limit ought to be seen in experiments, though none have yet been reported.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1063/1.857551

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Axisymmetric shapes and stability of charged drops in an external electric field (1989)

Basaran, O. A. ; Scriven, L. E.

New York, NY : American Institute of Physics (AIP)

Physics of Fluids 1 (1989), S. 799-809

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ISSN: 1089-7666

Source: AIP Digital Archive

Topics: Physics

Notes: A highly conducting charged drop that is surrounded by a fluid insulator of another density can be levitated by suitably applying a uniform electric field. Axisymmetric equilibrium shapes and stability of the levitated drop are found by solving simultaneously the augmented Young–Laplace equation for surface shape and the Laplace equation for the electric field, together with constraints of fixed drop volume, charge, and center of mass. The means are a method of subdomains, finite element basis functions, and Galerkin's method of weighted residuals, all facilitated by a large-scale computer. Shape families of fixed charge are treated systematically by first-order continuation. Previous analyses by Abbas et al. in 1967 and Abbas and Latham in 1969, in which the shapes of levitated drops are approximated as spheroids, are corrected. The new analysis shows that drops charged to less than the Rayleigh limit lose shape stability at turning points, with respect to external field strength, and that the instability seen in experiments of Doyle et al. in 1964 and others is not a bifurcation to a family of two-lobed shapes, but rather is a related imperfect bifurcation.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1063/1.857377

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Electrostatic spraying of nonconductive fluids into conductive fluids (1994)

Tsouris, C. ; DePaoli, D. W. ; Feng, J. Q. ; [et al.]

Hoboken, NJ : Wiley-Blackwell

AIChE Journal 40 (1994), S. 1920-1923

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ISSN: 0001-1541

Keywords: Chemistry ; Chemical Engineering

Source: Wiley InterScience Backfile Collection 1832-2000

Topics: Chemistry and Pharmacology , Process Engineering, Biotechnology, Nutrition Technology

Additional Material: 4 Ill.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1002/aic.690401116

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