Introduction One - Dimensional Bubbly Cavitating Flows Through a Converging - Diverging Nozzle
نویسنده
چکیده
A nonbarotropic continuum bubbly mixture model is used to study the one-dimensional cavitatingjow through a converging-diverging nozzle. The nonlinear dynamics of the cavitation bubbles are modeled by the Rayleigh-Plesset equation. Analytical results show that the bubble/bubble interaction through the hydrodynamics of the surrounding liquid has important effects on this conjined JEow jield. One clear interaction effect is the Bernoulli effect caused by the growing and collapsing bubbles in the nozzle. It is found that the characteristics of the flow change dramatically even when the upstream void fraction is very small. Two different flow regimes are found from the steady state solutions and are termed: quasi-steady md g~ms~-~s~ecady The former is characterized by large spatial fluctuations downstream of the throat which are induced by the pulsations ofthe cavitation bubbles. The quasi-unsteady solutions correspond to flashing flow. Bifurcation occurs as the flow transitions from one regime to the other. An analytical expression for the critical bubble size at the bifurcation is obtained. Physical reasons for this quasi-static instability are also discussed.
منابع مشابه
One-dimensional Bubbly Cavitating Flows through a Converging-diverging Nozzle
A non-barotropic continuum bubbly mixture model is used to study the one-dimensional cavitating ow through a converging-diverging nozzle. The nonlinear dynamics of the cavitation bubbles are modeled by the Rayleigh-Plesset equation. Analytical results show that the bubble/bubble interaction through the hydrodynamics of the surrounding liquid has important e ects on this con ned ow eld. One clea...
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