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包膜微泡在非线性声场下的响应对高强度聚焦超声治疗具有重要意义. 本文通过耦合Gilmore-Akulichev-Zener模型与脂质包膜的非线性模型, 采用KZK方程仿真非线性声场, 分析在不同超声频率、不同声压以及不同包膜材料的黏弹性下的微泡动力学行为和微泡振荡频率, 并进一步对比了实际测量声场与KZK方程仿真声场下的微泡动力学行为和频率响应. 研究结果表明: 非线性声场会导致微泡壁的瞬时运动速率减小, 声压和频率的改变对微泡动力学的影响与在线性声场中类似; 包膜材料的不同可以使振荡频率中的谐波分量发生改变, 其中包膜材料的弹性对微泡的频率响应影响较小, 包膜的初始黏性和初始表面张力对微泡的振荡频率分布影响较大, 当初始黏性越小时, 二次分谐波的峰值越高, 当初始表面张力越大时, 主频的峰值越高. 本研究进一步阐明非线性超声激励包膜微泡的微泡动力学, 为包膜微泡在非线性声场下的频率响应分析奠定理论基础.Bubble dynamic behavior and frequency response of encapsulated microbubbles in nonlinear acoustic field is significant in applications such as tumor therapy, thrombolysis, tissue destruction, and ultrasonic lithotripsy. The acoustic cavitation effect includes stable cavitation and transient cavitation. The transformation from stable cavitation to transient cavitation requires a certain threshold, which is also called the transient cavitation threshold. Phospholipid-coated microbubbles are commonly used to enhance acoustic cavitation. However, the acoustic effects of different coating materials are not very clear, especially when considering the nonlinear effects caused by diffraction, scattering, and reflection during ultrasonic propagation. In this paper, the bubble dynamic behaviors and frequency responses of microbubbles under different frequencies, acoustic pressures, and viscoelastic properties of different shell materials are analyzed by coupling the Gilmore-Akulichev-Zener model with the nonlinear model of a lipid envelope and using the KZK equation to simulate the nonlinear acoustic field. At the same time, the influence of the coated material and nonlinear acoustic effects are considered. The bubble dynamic behavior and frequency response under the actually measured sound field are compared with those simulated by the KZK equation. The results show that the nonlinearity will lead the velocity of the microbubble wall to decrease, and when the pressure of ultrasound increases, the main frequency component of the microbubble oscillation increases, making the radial motion of the microbubble more violent. When the frequency changes, the closer the oscillation frequency of the microbubble is to the resonant frequency, the stronger the radial motion of the microbubble is. The coating material can change the harmonic component in the oscillation frequency. When the harmonic is close to the resonance frequency, the radial motion of the microbubble is enhanced. The elasticity of the coated material has almost no effect on the microbubble's frequency response, and the initial viscosity and surface tension of encapsulated microbubble will change the oscillation frequency distribution of encapsulated microbubble. When the initial viscosity of the coated microbubble is smaller, the subharmonic component of the microbubble oscillation increases. When the frequency of the subharmonic is closer to the resonance frequency than the main frequency, the acoustic cavitation effect is significantly enhanced. On the other hand, when the initial surface tension of the encapsulated microbubble increases, the main frequency and subharmonic component of the microbubble oscillation are enhanced, so that the acoustic cavitation effect is also enhanced. Therefore, this study can further elucidate the bubble dynamics of encapsulated microbubbles, stimulated by nonlinear ultrasound, benefiting the frequency response analysis of coated microbubbles under nonlinear acoustic fields.
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Keywords:
- bubble dynamics /
- nonlinear acoustic field /
- encapsulated microbubble /
- frequency response
[1] Yasui K 2018 Acoustic Cavitation and Bubble Dynamics (Springer
[2] Ashokkumar M 2011 Ultrason. Sonochem. 18 864Google Scholar
[3] 沈壮志, 林书玉 2011 物理学报 60 084302Google Scholar
Shen Z Z, Lin S Y 2011 Acta Phys. Sin. 60 084302Google Scholar
[4] Gielen B, Jordens J, Janssen J, Pfeiffer H, Wevers M, Thomassen L C J, Braeken L, Van Gerven T 2015 Ultrason. Sonochem. 25 31Google Scholar
[5] Petit B, Bohren Y, Gaud E, Bussat P, Arditi M, Yan F, Tranquart F, Allémann E 2015 Ultrasound Med. Biol. 41 1402Google Scholar
[6] Jiménez-Fernández J, Crespo A 2005 Ultrasonics 43 643Google Scholar
[7] Izadifar Z, Babyn P, Chapman D 2019 J. Med. Biol. Eng. 39 259Google Scholar
[8] van den Bijgaart R J E, Eikelenboom D C, Hoogenboom M, Fütterer J J, den Brok M H, Adema G J 2017 Cancer Immunol. Immunother. 66 247Google Scholar
[9] Clark A, Bonilla S, Suo D J, Shapira Y, Averkiou M 2021 Ultrasound Med. Biol. 47 2296Google Scholar
[10] Suo D J, Guo S, Lin W, Jiang X, Jing Y 2015 Phys. Med. Biol. 60 7403Google Scholar
[11] Suo D J, Govind B, Gu J, Dayton P A, Jing Y 2019 J. Appl. Phys. 125 084702Google Scholar
[12] Belzberg M, Mahapatra S, Perdomo-Pantoja A, Chavez F, Morrison K, Xiong K T, Gamo N J, Restaino S, Thakor N, Yazdi Y, Iyer R, Tyler B, Theodore N, Luciano M G, Brem H, Groves M, Cohen A R, Manbachi A 2020 Ultrasonics 108 106210Google Scholar
[13] Cambronero S, Dupré A, Mastier C, Melodelima D 2023 Ultrasound Med. Biol. 49 212Google Scholar
[14] Lauterborn W, Kurz T, Geisler R, Schanz D, Lindau O 2007 Ultrason. Sonochem. 14 484Google Scholar
[15] Lee J, Yasui K, Ashokkumar M, Kentish S E 2018 Cryst. Growth Des. 18 5108Google Scholar
[16] Pandit A V, Sarvothaman V P, Ranade V V 2021 Ultrason. Sonochem. 77 105677Google Scholar
[17] Yusof N S M, Babgi B, Alghamdi Y, Aksu M, Madhavan J, Ashokkumar M 2016 Ultrason. Sonochem. 29 568Google Scholar
[18] Zhang L, Li Z D, Li K, Li H X, Zhao J F 2015 Appl. Therm. Eng. 88 118Google Scholar
[19] Daghooghi-Mobarakeh H, Daghooghi M, Miner M, Wang L, Wang R, Phelan P E 2022 Therm. Sci. Eng. Prog. 33 101374Google Scholar
[20] Alehossein H, Qin Z 2007 Int. J. Numer. Methods Eng. 72 780Google Scholar
[21] Keller J B, Miksis M 1980 J. Acoust. Soc. Am. 68 628Google Scholar
[22] Doinikov A A 2002 Phys. Fluids 14 1420Google Scholar
[23] Pelekasis N A, Gaki A, Doinikov A, Tsamopoulos J A 2004 J. Fluid Mech. 500 313Google Scholar
[24] Yang X, Church C C 2005 Acoust. Res. Lett. Online 6 151Google Scholar
[25] Suo D J, Govind B, Zhang S, Jing Y 2018 Ultrason. Sonochem. 41 419Google Scholar
[26] Zilonova E, Solovchuk M, Sheu T W H 2018 Ultrason. Sonochem. 40 900Google Scholar
[27] Marmottant P, van der Meer S, Emmer M, Versluis M, de Jong N, Hilgenfeldt S, Lohse D 2005 J. Acoust. Soc. Am. 118 3499Google Scholar
[28] Cui Z, Li D, Xu S, Xu T, Wu S, Bouakaz A, Wan M, Zhang S 2020 Ultrason. Sonochem. 63 104935Google Scholar
[29] 于洁, 郭霞生, 屠娟, 章东 2015 物理学报 64 094306Google Scholar
Yu J, Guo X S, Tu J, Zhang D 2015 Acta Phys. Sin. 64 094306Google Scholar
[30] 秦对, 邹青钦, 李章勇, 王伟, 万明习, 冯怡 2021 物理学报 70 154701Google Scholar
Qin D, Zou Q Q, Li Z Y, Wang W, Wan M X, Feng Y 2021 Acta Phys. Sin. 70 154701Google Scholar
[31] Kostin I, Panasenko G 2006 CR Mécanique 334 220Google Scholar
[32] Shevchenko I, Kaltenbacher B 2015 J. Comput. Phys. 302 200Google Scholar
[33] Bakhtiari-Nejad M, Shahab S 2019 Acoustics 1 14Google Scholar
[34] Ghalichi F, Behnia S, Mottaghi F, Yahyavi M 2020 Phys. Scr. 95 085215Google Scholar
[35] Gharloghi S, Gholami M, Haghparast A, Dehlaghi V 2017 Iran. J. Med. Phys. 14 15Google Scholar
[36] Wang M, Lei Y, Zhou Y 2019 Ultrasonics 91 134Google Scholar
[37] Li Z, Zou Q, Qin D 2022 Phys. Med. Biol. 67 085017Google Scholar
[38] Shen Y, Zhang L, Wu Y, Chen W 2021 Ultrason. Sonochem. 73 105535Google Scholar
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图 1 线性声场和非线性声场下微泡动力学行为频率响应 (a) 相同正压下的线性超声与非线性超声波形图; (b), (c) 微泡动力学行为的对比; (d) 微泡半径变化的振荡频率响应, 蓝色线条表示驱动声压为KZK方程仿真的非线性声场, 红色线条表示线性声场
Fig. 1. Dynamics behavior and frequency response of microbubbles under linear and nonlinear ultrasound fields: (a) Linear and nonlinear ultrasonic waveforms under the same positive pressure; (b), (c) comparison of bubble dynamics behaviors; (d) oscillation frequency response of the microbubble radius change, the blue lines represent the driving sound pressure as the nonlinear ultrasound field simulated by the KZK equation, and the red lines represent the linear ultrasound field.
图 2 (a), (b), (e) 不同声压下非线性超声的微泡动力学行为和频率响应的差异; (c), (d), (f) 不同频率下非线性超声的微泡动力学行为和频率响应差异
Fig. 2. (a), (b), (e) Differences in the kinetic behavior and frequency response of microbubbles in nonlinear ultrasound at different acoustic pressures; (c), (d), (f) differences in microbubble kinetic behavior and frequency response of microbubbles in nonlinear ultrasound at different frequencies.
图 3 不同包膜材料对微泡动力学行为和频率响应影响 (a), (b) 包膜微泡的初始表面张力; (c), (d) 包膜的黏性参数
Fig. 3. Effects of different coating materials on bubble dynamic behavior and frequency response of encapsulated microbubbles: (a), (b) Initial surface tension of encapsulated microbubbles; (c), (d) viscosity parameters of encapsulated microbubbles.
图 5 实际测量值与KZK仿真对比图 (a) 相同正压下实际测量与KZK方程仿真波形图; (b), (c) 微泡动力学行为的对比; (d) 微泡半径变化的振荡频率响应
Fig. 5. Actual measured values are compared with the KZK simulation: (a) Actual measurement and KZK equation simulation waveform diagram under the same positive pressure; (b), (c) comparison of the dynamic behavior of microbubbles; (d) oscillation frequency response of the microbubble radius change.
表 1 参数名称和值
Table 1. Name and value of the parameters.
参数 值 静态压力$ {p}_{0} $ 0.1013 MPa 初始半径$ {R}_{0} $ — 多向性系数$ \gamma $ 1.4 Gilmore方程的常数n 7 壳的初始黏性参数$ {k}_{0} $ 5×10–8 kg·s–1 特征时间常数$ \alpha $ 5×10–7 s 包膜微泡的弹性$ \lambda $ 0.44 N/m 介质中的黏性$ \mu $ 0.009 Pa·s 初始表面张力$ {\sigma }_{0} $ 0.01 N/m 组织的表面张力$ {\sigma }_{t} $ 0.068 N/m 组织的松弛时间$ \varphi $ 3×10–9 s 气泡壁的焓变H — 组织密度$ \rho $ 1000 kg/m3 介质的弹性模量G 0 Pa -
[1] Yasui K 2018 Acoustic Cavitation and Bubble Dynamics (Springer
[2] Ashokkumar M 2011 Ultrason. Sonochem. 18 864Google Scholar
[3] 沈壮志, 林书玉 2011 物理学报 60 084302Google Scholar
Shen Z Z, Lin S Y 2011 Acta Phys. Sin. 60 084302Google Scholar
[4] Gielen B, Jordens J, Janssen J, Pfeiffer H, Wevers M, Thomassen L C J, Braeken L, Van Gerven T 2015 Ultrason. Sonochem. 25 31Google Scholar
[5] Petit B, Bohren Y, Gaud E, Bussat P, Arditi M, Yan F, Tranquart F, Allémann E 2015 Ultrasound Med. Biol. 41 1402Google Scholar
[6] Jiménez-Fernández J, Crespo A 2005 Ultrasonics 43 643Google Scholar
[7] Izadifar Z, Babyn P, Chapman D 2019 J. Med. Biol. Eng. 39 259Google Scholar
[8] van den Bijgaart R J E, Eikelenboom D C, Hoogenboom M, Fütterer J J, den Brok M H, Adema G J 2017 Cancer Immunol. Immunother. 66 247Google Scholar
[9] Clark A, Bonilla S, Suo D J, Shapira Y, Averkiou M 2021 Ultrasound Med. Biol. 47 2296Google Scholar
[10] Suo D J, Guo S, Lin W, Jiang X, Jing Y 2015 Phys. Med. Biol. 60 7403Google Scholar
[11] Suo D J, Govind B, Gu J, Dayton P A, Jing Y 2019 J. Appl. Phys. 125 084702Google Scholar
[12] Belzberg M, Mahapatra S, Perdomo-Pantoja A, Chavez F, Morrison K, Xiong K T, Gamo N J, Restaino S, Thakor N, Yazdi Y, Iyer R, Tyler B, Theodore N, Luciano M G, Brem H, Groves M, Cohen A R, Manbachi A 2020 Ultrasonics 108 106210Google Scholar
[13] Cambronero S, Dupré A, Mastier C, Melodelima D 2023 Ultrasound Med. Biol. 49 212Google Scholar
[14] Lauterborn W, Kurz T, Geisler R, Schanz D, Lindau O 2007 Ultrason. Sonochem. 14 484Google Scholar
[15] Lee J, Yasui K, Ashokkumar M, Kentish S E 2018 Cryst. Growth Des. 18 5108Google Scholar
[16] Pandit A V, Sarvothaman V P, Ranade V V 2021 Ultrason. Sonochem. 77 105677Google Scholar
[17] Yusof N S M, Babgi B, Alghamdi Y, Aksu M, Madhavan J, Ashokkumar M 2016 Ultrason. Sonochem. 29 568Google Scholar
[18] Zhang L, Li Z D, Li K, Li H X, Zhao J F 2015 Appl. Therm. Eng. 88 118Google Scholar
[19] Daghooghi-Mobarakeh H, Daghooghi M, Miner M, Wang L, Wang R, Phelan P E 2022 Therm. Sci. Eng. Prog. 33 101374Google Scholar
[20] Alehossein H, Qin Z 2007 Int. J. Numer. Methods Eng. 72 780Google Scholar
[21] Keller J B, Miksis M 1980 J. Acoust. Soc. Am. 68 628Google Scholar
[22] Doinikov A A 2002 Phys. Fluids 14 1420Google Scholar
[23] Pelekasis N A, Gaki A, Doinikov A, Tsamopoulos J A 2004 J. Fluid Mech. 500 313Google Scholar
[24] Yang X, Church C C 2005 Acoust. Res. Lett. Online 6 151Google Scholar
[25] Suo D J, Govind B, Zhang S, Jing Y 2018 Ultrason. Sonochem. 41 419Google Scholar
[26] Zilonova E, Solovchuk M, Sheu T W H 2018 Ultrason. Sonochem. 40 900Google Scholar
[27] Marmottant P, van der Meer S, Emmer M, Versluis M, de Jong N, Hilgenfeldt S, Lohse D 2005 J. Acoust. Soc. Am. 118 3499Google Scholar
[28] Cui Z, Li D, Xu S, Xu T, Wu S, Bouakaz A, Wan M, Zhang S 2020 Ultrason. Sonochem. 63 104935Google Scholar
[29] 于洁, 郭霞生, 屠娟, 章东 2015 物理学报 64 094306Google Scholar
Yu J, Guo X S, Tu J, Zhang D 2015 Acta Phys. Sin. 64 094306Google Scholar
[30] 秦对, 邹青钦, 李章勇, 王伟, 万明习, 冯怡 2021 物理学报 70 154701Google Scholar
Qin D, Zou Q Q, Li Z Y, Wang W, Wan M X, Feng Y 2021 Acta Phys. Sin. 70 154701Google Scholar
[31] Kostin I, Panasenko G 2006 CR Mécanique 334 220Google Scholar
[32] Shevchenko I, Kaltenbacher B 2015 J. Comput. Phys. 302 200Google Scholar
[33] Bakhtiari-Nejad M, Shahab S 2019 Acoustics 1 14Google Scholar
[34] Ghalichi F, Behnia S, Mottaghi F, Yahyavi M 2020 Phys. Scr. 95 085215Google Scholar
[35] Gharloghi S, Gholami M, Haghparast A, Dehlaghi V 2017 Iran. J. Med. Phys. 14 15Google Scholar
[36] Wang M, Lei Y, Zhou Y 2019 Ultrasonics 91 134Google Scholar
[37] Li Z, Zou Q, Qin D 2022 Phys. Med. Biol. 67 085017Google Scholar
[38] Shen Y, Zhang L, Wu Y, Chen W 2021 Ultrason. Sonochem. 73 105535Google Scholar
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