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利用高速摄影机对驱动频率分别为28 kHz和40 kHz的超声空化场中距离水面约1/4波长范围内的球状气泡团的上浮生长和演化过程进行实验观察, 分析了声软界面附近驻波场声压幅值变化对泡团结构变化的影响, 以及泡团从球状向伞状和层状结构演化的行为特征. 为分析空化场中球状泡团生长演化机理, 利用镜像原理构建了一个考虑边界(水-空气)影响的球状泡团模型, 得到了修正的球状泡团内气泡动力学方程. 利用等效势数值分析了两个频率下驱动声压幅值、气泡数密度、距离水面深度以及气泡平衡半径对球状泡团最佳稳定半径的影响. 结果表明, 球状泡团的最佳稳定半径在1—2 mm的范围, 且随着驱动声压幅值和气泡数密度的增大, 球状泡团最佳稳定半径有减小的趋势, 但差异不显著; 驱动频率为40 kHz条件下的球状泡团稳定尺寸略小于驱动频率为28 kHz情形; 在弱声场中若能形成气泡聚集, 仍可观察到较小尺寸的球状泡团, 但当声压低于某临界值, 泡团将不能存在. 理论分析与实验观察结果具有很好的一致性. 球状泡团的生长和结构稳定特性分析有助于理解声场和边界对气泡的行为调控.The upwelling growth and evolution of spherical bubble clusters appearing at one-quarter wavelength from the water surface in ultrasonic cavitation fields at frequencies of 28 kHz and 40 kHz are studied by high-speed photography. Due to the interactions among bubbles, the stable bubble aggregation occurs throughout the rise of the bubble cluster, whose vertical pressure difference leads to a more significant spreading in the upper part of the cluster in the standing-wave field. At 28 kHz, the rising speed is about 0.6 m/s, controlled by the primary acoustic field. After a violent collapse of the bubble clusters, the aggregating structure begins to hover near the water surface. The size and stability of the structure are affected by the frequency and pressure of the primary acoustic field. If two clusters are close to each other, the clusters deviate from the spherical shape, even trailing off, and eventually merge into a single bubble cluster. By considering the influence of water-air boundary, based on the mirror principle, a spherical bubble cluster model is developed to explore the structure stability of the clusters, and the modified dynamics equations are obtained. The effects of driving acoustic pressure amplitude, bubble number density, water depth, and bubble equilibrium radius on the optimal stable radius of the spherical bubble cluster are numerically analyzed by using the equivalent potentials at 28 kHz and 40 kHz. The results show that the optimal stabilizing radius of spherical bubble cluster is in a range of 1–2 mm, and it tends to decrease slightly with the increase of the driving acoustic pressure and bubble number density. It is worth noting that the nonlinearity is enhanced by increasing acoustic pressure, which may promote the stability of the cluster structure. The smaller the unstable equilibrium radius, the easier it is to grow, and the stable size at 40 kHz is slightly smaller than that at 28 kHz. Generally, spherical clusters first appear in a high-pressure region and then move to a low-pressure region. If the acoustic pressure drops below a certain critical value, bubble clusters disappear. The theoretical analysis is in good agreement with the experimental observation. The analysis of the growth and structural stability of spherical bubble cluster is helpful in understanding the behavioral modulation of bubbles.
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Keywords:
- spherical bubble cluster /
- cavitation structure /
- interfacial influence /
- stability
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图 8 泡团中心处气泡半径随时间变化曲线, n = 9×1012. f = 28 kHz, a = 11 mm, R0 = 6 μm (a)考虑边界; (b)不考虑边界. f = 40 kHz, a = 9 mm, R0 = 5 μm (c)考虑边界; (d)不考虑边界
Fig. 8. Bubble radius at the center of the bubble cluster versus time, n = 9×1012: (a) With and (b) without considering the impacts of soft boundary, f = 28 kHz, a = 11 mm, R0 = 6 μm; (c) with and (d) without considering the impacts of soft boundary, f = 40 kHz, a = 9 mm, R0 = 5 μm.
图 12 球状泡团内气泡平衡半径对等效势的影响 (Pa = 150 kPa) (a) f = 28 kHz, a = 11 mm, 泡团内气泡占空比为0.0081; (b) f = 40 kHz, a = 9 mm, 泡团内气泡占空比为0.0047
Fig. 12. Influence of the equivalent radii of small bubbles within the cluster on the equivalent potential (Pa = 150 kPa): (a) f = 28 kHz, a = 11 mm, and void ratio of the cluster is 0.0081; (b) f = 40 kHz, a = 9 mm, and void ratio of the cluster is 0.0047
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[1] 应崇福 2007 中国科学: 物理学 力学 天文学 37 129Google Scholar
Ying C F 2007 Sci. Sin. Phys. Mech. Astron. 37 129Google Scholar
[2] 程效锐, 张舒研, 房宁 2018 应用化工 47 1753Google Scholar
Cheng X R, Zhang S Y, Fang N 2018 Appl. Chem. Ind. 47 1753Google Scholar
[3] Ehsan Z S, Christian G, Helmut P, Christian J, Michael B, Cheistian B, Niels J, Christoph F D 2022 Ultrasound Med. Biol. 48 598Google Scholar
[4] Plesset S M, Prosperetti A 1977 Ann. Rev. Fluid Mech. 85 145
[5] 陈伟中 2014 声空化物理 (北京: 科学出版社) 第231—236页
Chen W Z 2014 Acoustic Cavitation Physics (Beijing: Science Press) pp231–236
[6] Keller B J, Miksis M 1998 J. Acoust. Soc. Am. 68 628Google Scholar
[7] Rasoul S B, Nastaran R, Homa E, Mona M 2010 Phys. Rev. E 82 016316Google Scholar
[8] Bai L X, Xu W L, Deng J J, Gao Y D 2014 Ultrason. Sonochem. 21 1696Google Scholar
[9] Yu A 2011 Phys. Rev. E 83 066313Google Scholar
[10] Zhang W J, An Y 2013 Phys. Rev. E 87 053023.Google Scholar
[11] Hansson I, Mctrch K A 1980 J. Appl. Phys. 51 4651Google Scholar
[12] Wu P F, Bai L X, Lin W J, Yan J C 2017 Ultrason. Sonochem. 38 75Google Scholar
[13] Li F, Zhang X M, Tian H, Hu J, Chen S, Wang C H, Guo J Z, Mo R Y 2022 Acta Phys. Sin. 71 084303 [李凡, 张先梅, 田华, 胡静, 陈时, 王成会, 郭建中, 莫润阳 2022 71 084303]Google Scholar
Li F, Zhang X M, Tian H, Hu J, Chen S, Wang C H, Guo J Z, Mo R Y 2022 Acta Phys. Sin. 71 084303Google Scholar
[14] Parlitz O, Lauterbor W 1994 J. Acoust. Soc. Am. 96 3627Google Scholar
[15] Akhatov I, Parlitz U, Lauterborn W 1996 Phys. Rev. E 54 4992Google Scholar
[16] Appel J, Koch P, Mettin R, Krefting D, Lauterborn W 2004 Ultrason. Sonochem. 11 39Google Scholar
[17] Li F, Zhang X M, Tian H, Hu J, Chen S, Mo R Y, Wang C H, Guo J Z 2022 Ultrason. Sonochem. 87 106057Google Scholar
[18] Li F, Huang C Y, Zhang X M, Wang C H, Guo J Z, Lin S Y, Tian H 2023 Ultrasonics 132 106992Google Scholar
[19] Xu K, Xu L, Zhou G P 2021 Acta Phys. Sin. 70 194301 [徐珂, 许龙, 周光平 2021 70 194301]Google Scholar
Xu K, Xu L, Zhou G P 2021 Acta Phys. Sin. 70 194301Google Scholar
[20] Nasibullaevaa E S, Akhatovb I S 2012 J. Acoust. Soc. Am. 133 3727Google Scholar
[21] Wang C H, Mo R Y, Hu J, Chen S 2015 Acta Phys. Sin. 64 234301 [王成会, 莫润阳, 胡静, 陈时 2015 64 234301]Google Scholar
Wang C H, Mo R Y, Hu J, Chen S 2015 Acta Phys. Sin. 64 234301Google Scholar
[22] Elwin W V, Christopher F 2021 J. Acoust. Soc. Am. 149 2477Google Scholar
[23] Joseph B, Keller, Ignace I, Kolodner 2004 J. Appl . Phys. 27 1152
[24] Christian V, Cleofé C P 2012 Ultrason. Sonochem. 19 217Google Scholar
[25] Kyuichi Y, Yasuo I, Toru T, Teruyuki K, Atsuya T 2008 Phys. Rev. E 77 016609Google Scholar
[26] Fabian R, Sergey L, Khadija A-B, Gunther B, Robert M 2019 Ultrason. Sonochem. 55 383Google Scholar
[27] Mettin R, Akhatov I, Parlitz U, Ohl C-D, Lauterborn W 1997 Phys. Rev. E 56 2924Google Scholar
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