Absolute Instability of a Liquid Jet in a Coflowing Stream

Utada, Andrew S.; Fernández‐Nieves, Alberto; Gordillo, José Manuel; Weitz, David A.

doi:10.1103/physrevlett.100.014502

Cited by 181 publications

(146 citation statements)

References 28 publications

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“…among others. More recently, Utada et al 20 have generalized these results by relaxing first the lubrication assumption and then the creeping flow limit, thus considering inertial effects that become significant at large capillary numbers.…”

Section: A Co-flowing Streamsmentioning

confidence: 99%

Dynamics of microfluidic droplets

2010

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This critical review discusses the current understanding of the formation, transport, and merging of drops in microfluidics. We focus on the physical ingredients which determine the flow of drops in microchannels and recall classical results of fluid dynamics which help explain the observed behaviour. We begin by introducing the main physical ingredients that differentiate droplet microfluidics from single-phase microfluidics, namely the modifications to the flow and pressure fields that are introduced by the presence of interfacial tension. Then three practical aspects are studied in detail: (i) The formation of drops and the dominant interactions depending on the geometry in which they are formed.(ii) The transport of drops, namely the evaluation of drop velocity, the pressure-velocity relationships, and the flow field induced by the presence of the drop. (iii) The fusion of two drops, including different methods of bridging the liquid film between them which enables their merging.

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Section: A Co-flowing Streamsmentioning

confidence: 99%

Dynamics of microfluidic droplets

2010

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“…Furthermore, it is known that an abrupt change of breakup length in the column jet appears at a transition between two different flow regimes (such as dripping and jetting), whose regimes are corresponding to the absolute and convective instabilities (9), (10) . It is then expected in the present analysis that the Weber number at which the abrupt change of z b appears in Fig.3(c) is just the critical Weber number Wb c , which is Wb c = 10 for φ = π and 2.4 for 0 from Fig.3(c).…”

Section: Journal Of Fluid Science and Technologymentioning

confidence: 99%

Nonlinear Instability and Breakup of a Viscous Compound Liquid Jet

Yoshinaga

Yamamoto

2011

JFST

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We analytically examine nonlinear instabilities and breakup phenomena of a viscous compound liquid jet which consists of a core and a surrounding annular phase. Applying the long wave approximation to both phases, a set of reduced nonlinear equations is derived for large deformations of the jet. Breakup phenomena are numerically examined when sinusoidal disturbances are fed at the end of the semi-infinite jet. Typical breakup profiles are shown for surface tension ratios and Reynolds numbers. In particular, for sufficiently small Reynolds numbers, the core phase is found to be choked at a bottle neck when the jet is pinching, which is followed by the ballooning of the annular phase in the upstream. It is shown that there exit the most unstable frequencies of input disturbances for each parameters of the surface tension, viscosity and amplitudes of disturbances. From variations of the breakup time and distance for such frequencies, it is expected that there exist critical Weber numbers, above which the jet becomes convectively unstable and below which absolutely unstable.

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“…Coaxial glass capillary devices have been used for making emulsions [12], microparticles [13], and giant vesicles [9]; however, so far, these devices…”

Section: Introductionmentioning

confidence: 99%