Modeling the mass transfer at acoustically generated bubble interface using Rayleigh-Plesset equation second-order derivatives

One of the many ways of cavitation utilized for process intensification is through acoustically inducing it. As acoustic cavitation gained traction in recent industrial works, numerical modeling became an important study tool to scrutinize and optimize acoustic cavitation applications. However, available hydrodynamic cavitation models are found incapable of accurately predicting acoustic cavitation structures and flow features. This could source from the oversimplification of the Rayleigh-Plesset equation or from obscure effects of empirical model constants. To address this issue, new mass transfer source terms for Zwart-Gerber-Belamri model were derived based on the consideration of Rayleigh-Plesset's second-order derivatives. In addition, a design of experiments statistical approach, coupled with Monte Carlo simulations, was implemented to assess the influence of empirical model constants on the model's performance by examining variations in amplitude and frequency responses. Moreover, a set of optimized model constants was obtained: evaporation constant=17.35988, condensation constant=0.1, Bubble Radius=25 x 10(-6) m, and Nucleation Site Volume Fraction=5 x 10(-4), to obtain a maximum pressure and frequency of 3.62bar and 4128.73Hz, respectively. The new model, with the new constants, was configured into ANSYS Fluent 22.1 and validated against experimental values. The new model resulted with maximum pressure and frequency of 3.48bar and 4894.56Hz, respectively, validating the statistical model and showing drastic improvement in qualitatively and quantitatively capturing acoustic cavitation. Published under an exclusive license by AIP Publishing.