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The dynamic behavior of coated microbubble in a magneto-acoustic field is very significant for its application to therapy. In this paper, the radial vibration equation of microbubble is derived by placing the coated-microbubbles in a tube filled with magnetic fluid and considering the magnetic pressure on the magnetic fluid under the magneto-acoustic field. The dynamic equation is nondimensionalized by using characteristic quantities such as Weber number and Reynolds number. The effects of magnetic-acoustic field parameters and magnetofluid characteristics on the vibration behavior of the vibration system are analyzed by the Runge-Kutta method. The results show that the magnetic field can prevent the collapse and make bubble oscillate stably. When the acoustic field is constant, the magnetic field can stabilize the oscillation of the microbubble and increase the equilibrium radius of the oscillating microbubble. The stronger the magnetic field is, the more obvious the influence of magnetofluid magnetisability χm on the vibration of the microbubble is and the stronger the nonlinear of the transient response of the microbubble is when the magnetic field is larger. In addition, the larger acoustic field parameters will enhance the response of oscillating microbubble to magnetic field. The larger the magnetic field is, the weaker the influence of acoustic parameters on the oscillations of microbubble is. Also, the transient response of microbubble is obviously nonlinear, but the steady-state response keeps the reciprocating oscillation with small amplitude. It can be seen that the adjusting of the magneto-acoustic field is beneficial to realizing the stable oscillation of microbubble in the blood vessel and avoiding collapse.
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Keywords:
- magnetic-acoustic composite field /
- finite tube /
- coated microbubble /
- vibration
[1] Michalakis A A, Matthew F B, Jeffry E P, Paul S S, Peter N B 2020 Ultrasound Med. Bio. 46 498Google Scholar
[2] Wischhusen J, Padilla F 2018 IRBM 40 10Google Scholar
[3] Pysz M A, Foygel K, Rosenberg J, Gambhir S S, Schneider M, Willmann J K 2010 Radiology 256 519Google Scholar
[4] Bekeredjian R, Grayburn P, Shohet R 2005 Am. Coll. Cardiol. 45 329Google Scholar
[5] Hernot S, Klibanov A 2008 Adv. Drug Deliv. Rev. 60 1153Google Scholar
[6] Martin M J, Chung E M L, Goodall A H 2008 J. Vasc. Surg. 47 1371Google Scholar
[7] Owen J, Pankhurst Q, Stride E 2012 Int. J. Hyperthermia 28 362Google Scholar
[8] Yvonn H, Staffan H, Alexandra H, Bernhard G, Martina A, Dietmar E, Daniela W, Alexander P, Markus W, Florian K, Ulrich P, Hanna M 2017 Theranostics 7 295Google Scholar
[9] Iwanaga K, Tominaga K, Yamamoto K, Habu M, Maeda H, Akifusa S, Tsujisawa T, Okinaga T, Fukuda J, Nishihara T 2007 Cancer Gene Ther. 14 354Google Scholar
[10] Fan C H, Cheng Y H, Ting C Y, Ho Y J, Hsu P H, Liu H L, Yeh C K 2016 Theranostics 6 1542Google Scholar
[11] de Saint V M, Carugo D, Barnsley L C, Owen J, Coussios C-C, Stride E 2017 Phys. Med. Biol. 62 7451Google Scholar
[12] Bi F, Zhang J, Su Y J, Chun Y J, Tang Ya, Liu J N 2009 Biomaterials 30 5125Google Scholar
[13] Mulvana H, Eckersley R J, Tang M X, Pankhurst Q, Stride E 2012 Ultrasound Med. Biol. 38 864Google Scholar
[14] Yan L P, Miao W, Li D D 2020 J. Nanotechno. 20 6087Google Scholar
[15] Lind, Steven J 2014 Phys. Fluids 6 26Google Scholar
[16] Malvar S, Gontijo R G, Cunha F R 2018 J. Eng. Math. 108 143Google Scholar
[17] Church C C 1995 J. Acoust. Soc. Am. 97 1510Google Scholar
[18] 赵丽霞, 王成会, 莫润阳 2021 物理学报 70 014301Google Scholar
Zhao L X, Wang C H, Mo R Y 2021 Acta Phys. Sin. 70 014301Google Scholar
[19] Sassaroli E, Hynynen K 2005 Phys. Med. Biol. 50 5293Google Scholar
[20] Ni B Y, Zhang A M, Wang Q X, Wang B 2012 Acta. Mechanica Sinica. 28 1248Google Scholar
[21] Fan Y Z, Li H S, Daniel F 2020 Phys. Week 102 013105Google Scholar
[22] Qin S P, Ferrara K W 2006 Phys. Med. Biol. 51 5065Google Scholar
[23] Owen J, Rademeyer P, Chung D, Cheng Q, Holroyd D, Coussios C, Friend P, Pankhurst Q A, Stride E 2015 Interface Focus 5 20150001Google Scholar
[24] Beguin E, Gray M D, Logan K A, Nesbitt H, Sheng Y J, Kamila S, Barnsley L C, Bau L, McHale A P, Callan J F, Stride E 2020 J. Controlled Release 317 23Google Scholar
[25] Zhang B H, Kim H, Jiang X N 2019 Ultrasonics 98 62Google Scholar
[26] Droste D W 2008 Eur. Neurol. 1 2Google Scholar
[27] 莫润阳, 吴临燕, 詹思楠, 张引红 2015 物理学报 64 124301Google Scholar
Mo R Y, Wu L Y, Zhan S N, Zhang Y H 2015 Acta Phys. Sin. 64 124301Google Scholar
[28] Zudin Y B, Isakov N S, Zenin V V 2014 J. Eng. Thermophys. 87 1487Google Scholar
[29] Stride E 2008 Philos. T. R. Soc. A 366 2103Google Scholar
[30] Stride E, Porter C, Prieto A G, Pankhurst Q 2009 Ultrasound Med. Biol. 35 861Google Scholar
[31] 毕勤成, 施东晓, 何永清, 邱晟华 2010 热科学与技术 9 189
Bi Q C, Shi D X, He Y Q, Qiu S H 2010 J. Ther. Sci. Techno. 9 189
[32] 陈杰, 张杰, 莫润阳, 王成会, 胡静 2020 磁性材料及器件 51 9
Chen J, Zhang J, Mo R Y, Wang C H, Hu J 2020 J. Magn. Mater. Device 51 9
[33] Owen J, Grove P, Rademeyer P, Stride E 2014 J. R. Soc. Interface 11 20140622Google Scholar
[34] Victor M S, Crake C, Coussios C C, Stride E 2014 Expert Opin. Drug Del. 11 87Google Scholar
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图 2 无磁场存在(Remag→
$ {\infty } $ )时, 管内微泡在声场驱动下的振荡特性 (a) R*-t*图; (b) PG/P0-t*图; (c) 振动相图 (We = 5, a = 2, ω = 1)Figure 2. When magnetic field is absent (Remag→
$ {\infty } $ ), the oscillation characteristics of the microbubble in a tube driven by acoustic field(We = 5, a = 2, ω = 1): (a) R*-t* plot; (b) PG/P0-t* plot; (c) the vibration phase diagram (We = 5, a = 2, ω = 1).图 3 振荡微泡的磁场响应, 其中包括(a)—(c) R*-t*图及对应(d)—(f)相图(We = 5, a = 2, ω = 1, χm = 0.1) (a), (d) Remag = 10; (b), (e) Remag = 1; (c), (f) Remag = 0.5
Figure 3. Magnetic field response of the oscillating microbubble (We = 5, a = 2, ω = 1, χm = 0.1), including (a)−(c) R*-t* plot and corresponding (d)−(f) phase diagram: (a), (d) Remag = 10; (b), (e) Remag = 1; (c), (f) Remag = 0.5.
图 4 磁化率χm不同的磁流体中振荡微泡的磁场响应, 其中包括(a)—(c) R*−t*图及相应(d)—(f)相图(We = 5, a = 2, ω = 1) (a), (d) Remag = 10; (b), (e) Remag = 1; (c), (f) Remag = 0.5
Figure 4. Magnetic field response of the oscillating microbubble in the magnetic fluid with different susceptibility χm (We = 5, a = 2, ω = 1), including (a)−(c) R*−t* plot and corresponding (d)−(f) phase diagram: (a), (d) Remag = 10; (b), (e) Remag = 1; (c), (f) Remag = 0.5
图 5 ω = 5时振荡微泡的磁响应, 其中包括(a)—(c) R*-t*图及相应(d)—(f)相图(We =10, a = 2, χm = 1) (a), (d) Remag →
$ {\infty } $ ; (b), (e) Remag = 1; (c), (f) Remag = 0.5Figure 5. Magnetic response of the oscillating microbubble at ω = 5 (We = 10, a = 2, χm = 1), including (a)−(c) R*-t* plot and corresponding (d)−(f) phase diagram: (a), (d) Remag→
$ {\infty } $ ; (b), (e) Remag = 1; (c), (f) Remag = 0.5.图 6 ω = 10时振荡微泡的磁响应, 其中包括(a)—(c) R*-t*图及相应(d)—(f)相图(We = 10, a = 2, χm = 1) (a), (d) Remag→
$ {\infty } $ ; (b), (e) Remag = 1; (c), (f) Remag = 0.5Figure 6. Magnetic response of the oscillating microbubble at ω = 10 (We = 10, a = 2, χm = 1), including (a)−(c) R*-t* plot and corresponding (d)−(f) phase diagram: (a), (d) Remag→
$ {\infty } $ ; (b), (e) Remag = 1; (c), (f) Remag = 0.5.图 7 声压幅值不同时振荡微泡的磁响应R*-t*图 (We = 10, χm = 1) (a)—(c) 磁雷诺数Remag分别为
$ {\infty } $ , 1和0.5; (d)—(f)声压幅值a分别为2, 1和0.5Figure 7. Magnetic response of the oscillating microbubble with different acoustic pressure amplitudes (We = 10, χm = 1): (a)−(c) magnetic Reynolds number Remag is
$ {\infty } $ , 1 and 0.5, respectively; (d)−(f) acoustic pressure a is 2, 1 and 0.5, respectively. -
[1] Michalakis A A, Matthew F B, Jeffry E P, Paul S S, Peter N B 2020 Ultrasound Med. Bio. 46 498Google Scholar
[2] Wischhusen J, Padilla F 2018 IRBM 40 10Google Scholar
[3] Pysz M A, Foygel K, Rosenberg J, Gambhir S S, Schneider M, Willmann J K 2010 Radiology 256 519Google Scholar
[4] Bekeredjian R, Grayburn P, Shohet R 2005 Am. Coll. Cardiol. 45 329Google Scholar
[5] Hernot S, Klibanov A 2008 Adv. Drug Deliv. Rev. 60 1153Google Scholar
[6] Martin M J, Chung E M L, Goodall A H 2008 J. Vasc. Surg. 47 1371Google Scholar
[7] Owen J, Pankhurst Q, Stride E 2012 Int. J. Hyperthermia 28 362Google Scholar
[8] Yvonn H, Staffan H, Alexandra H, Bernhard G, Martina A, Dietmar E, Daniela W, Alexander P, Markus W, Florian K, Ulrich P, Hanna M 2017 Theranostics 7 295Google Scholar
[9] Iwanaga K, Tominaga K, Yamamoto K, Habu M, Maeda H, Akifusa S, Tsujisawa T, Okinaga T, Fukuda J, Nishihara T 2007 Cancer Gene Ther. 14 354Google Scholar
[10] Fan C H, Cheng Y H, Ting C Y, Ho Y J, Hsu P H, Liu H L, Yeh C K 2016 Theranostics 6 1542Google Scholar
[11] de Saint V M, Carugo D, Barnsley L C, Owen J, Coussios C-C, Stride E 2017 Phys. Med. Biol. 62 7451Google Scholar
[12] Bi F, Zhang J, Su Y J, Chun Y J, Tang Ya, Liu J N 2009 Biomaterials 30 5125Google Scholar
[13] Mulvana H, Eckersley R J, Tang M X, Pankhurst Q, Stride E 2012 Ultrasound Med. Biol. 38 864Google Scholar
[14] Yan L P, Miao W, Li D D 2020 J. Nanotechno. 20 6087Google Scholar
[15] Lind, Steven J 2014 Phys. Fluids 6 26Google Scholar
[16] Malvar S, Gontijo R G, Cunha F R 2018 J. Eng. Math. 108 143Google Scholar
[17] Church C C 1995 J. Acoust. Soc. Am. 97 1510Google Scholar
[18] 赵丽霞, 王成会, 莫润阳 2021 物理学报 70 014301Google Scholar
Zhao L X, Wang C H, Mo R Y 2021 Acta Phys. Sin. 70 014301Google Scholar
[19] Sassaroli E, Hynynen K 2005 Phys. Med. Biol. 50 5293Google Scholar
[20] Ni B Y, Zhang A M, Wang Q X, Wang B 2012 Acta. Mechanica Sinica. 28 1248Google Scholar
[21] Fan Y Z, Li H S, Daniel F 2020 Phys. Week 102 013105Google Scholar
[22] Qin S P, Ferrara K W 2006 Phys. Med. Biol. 51 5065Google Scholar
[23] Owen J, Rademeyer P, Chung D, Cheng Q, Holroyd D, Coussios C, Friend P, Pankhurst Q A, Stride E 2015 Interface Focus 5 20150001Google Scholar
[24] Beguin E, Gray M D, Logan K A, Nesbitt H, Sheng Y J, Kamila S, Barnsley L C, Bau L, McHale A P, Callan J F, Stride E 2020 J. Controlled Release 317 23Google Scholar
[25] Zhang B H, Kim H, Jiang X N 2019 Ultrasonics 98 62Google Scholar
[26] Droste D W 2008 Eur. Neurol. 1 2Google Scholar
[27] 莫润阳, 吴临燕, 詹思楠, 张引红 2015 物理学报 64 124301Google Scholar
Mo R Y, Wu L Y, Zhan S N, Zhang Y H 2015 Acta Phys. Sin. 64 124301Google Scholar
[28] Zudin Y B, Isakov N S, Zenin V V 2014 J. Eng. Thermophys. 87 1487Google Scholar
[29] Stride E 2008 Philos. T. R. Soc. A 366 2103Google Scholar
[30] Stride E, Porter C, Prieto A G, Pankhurst Q 2009 Ultrasound Med. Biol. 35 861Google Scholar
[31] 毕勤成, 施东晓, 何永清, 邱晟华 2010 热科学与技术 9 189
Bi Q C, Shi D X, He Y Q, Qiu S H 2010 J. Ther. Sci. Techno. 9 189
[32] 陈杰, 张杰, 莫润阳, 王成会, 胡静 2020 磁性材料及器件 51 9
Chen J, Zhang J, Mo R Y, Wang C H, Hu J 2020 J. Magn. Mater. Device 51 9
[33] Owen J, Grove P, Rademeyer P, Stride E 2014 J. R. Soc. Interface 11 20140622Google Scholar
[34] Victor M S, Crake C, Coussios C C, Stride E 2014 Expert Opin. Drug Del. 11 87Google Scholar
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