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For improving the low-frequency sound insulation properties of membrane/plate structures, a new quasi-zero stiffness membrane acoustic metamaterial with dynamic magnetic negative stiffness is proposed. When the equivalent magnetic charge theory is used to investigate the dynamic magnetic negative stiffness, a theoretical model of proposed metamaterial with finite dimension is established based on the Galerkin method. Through a combination of theoretical analysis, numerical simulation and experimental measurement, the low-frequency (1–1000 Hz) sound insulation performance of the metamaterial is investigated from several perspectives, including structural modality, vibration mode, average velocity, phase curve, equivalent mass density, and equivalent spring-mass dynamics model. The results show that at a certain initial membrane tension, the decreasing of the magnetic gap or the increasing of the residual flux density can increase the dynamic magnetic negative stiffness. This in turn leads the peak frequency to decrease and the bandwidth of sound insulation to increase, thus achieving effective low-frequency sound insulation over a wide frequency band. Further, when the magnetic gap is larger than the second critical magnetic gap and smaller than the first critical magnetic gap, the first-order modal resonance of the metamaterial disappears, and the corresponding value of sound insulation valley increases significantly, thus demonstrating superior sound insulation effect in a wide frequency band. The proposed method of using dynamic magnetic negative stiffness to improve low-frequency sound insulation valleys due to modal resonance provides useful theoretical guidance for designing membrane/plate type low-frequency sound insulation metamaterials.
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Keywords:
- membrane-type acoustic metamaterial /
- tunable acoustic insulation /
- magnetic negative stiffness /
- low frequency broadband
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Google Scholar
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Google Scholar
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Google Scholar
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Google Scholar
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Google Scholar
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Google Scholar
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Google Scholar
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Google Scholar
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Google Scholar
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Google Scholar
[23] Yang Z Y, Mei J, Yang M, Chan N H, Sheng P 2008 Phys. Rev. Lett. 101 204301
Google Scholar
[24] Lu Z B, Yu X, Lau S K, Khoo B C, Cui F S 2020 Appl. Acoust. 157 107003
Google Scholar
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Google Scholar
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Google Scholar
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Google Scholar
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Google Scholar
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Google Scholar
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Google Scholar
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Google Scholar
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Google Scholar
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Google Scholar
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Google Scholar
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Zhang G Y 2014 Ph. D. Dissertation (Changsha: National University of Defense Technology) (in Chinese)
[36] Meirovitch L 2001 Fundamentals of Vibrations (New York: McGraw-Hill Higher Education) pp529–530
[37] Lee J H, Kim J 2002 J. Sound Vib. 251 349
Google Scholar
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图 1 准零刚度薄膜声学超材料结构 (a) 单胞模型; (b) xoy中面图; (c) yoz中面图; (d) 简化模型
Figure 1. Unit cell of quasi-zero stiffness membrane acoustic metamaterial (QZSMAMM): (a) Schematic of unit cell; (b) xoy mid-plane view; (c) yoz mid-plane view; (d) simplified model.
图 2 矩形磁铁的磁荷模型示意图
Figure 2. Schematic of the magnetic charge model for a cuboidal magnet.
图 3 (a) 磁间隙保持不变(H = 4.0 mm), 磁力负刚度随剩余磁通密度的变化; (b) 剩余磁通密度保持不变(Br = 1.0 T), 磁力负刚度随磁间隙的变化
Figure 3. (a) Variation of negative magnetic stiffness with residual flux density at H = 4.0 mm; (b) variation of negative magnetic stiffness with magnetic gap at Br = 1.0 T.
图 4 1000 Hz垂直入射声激励下, QZSMAMM的TL收敛性验证
Figure 4. Convergence check of theoretically predicted transmission loss (TL) of QZSMAMM under the excitation of a normally incident sound wave at 1000 Hz.
图 5 QZSMAMM的有限元模型
Figure 5. Finite element simulation model of QZSMAMM.
图 6 三组对照结构的理论和数值模拟传输损失对比
Figure 6. Comparison between theoretical model predictions and numerical simulation results of transmission loss for three different structures.
图 7 共振模态 (a) 无动态磁负刚度; (b) Br = 1.0 T, H = 4.0 mm; (c) Br = 1.0 T, H = 3.5 mm
Figure 7. Resonance mode: (a) Non-NS; (b) Br = 1.0 T, H = 4.0 mm; (c) Br = 1.0 T, H = 3.5 mm.
图 8 隔声峰/谷的振动模式 (a) 无动态磁负刚度; (b) Br = 1.0 T, H = 4.0 mm; (c) Br = 1.0 T, H = 3.5 mm
Figure 8. Vibration mode diagrams at sound insulation peak/valley: (a) Non-NS; (b) Br = 1.0 T, H = 4.0 mm; (c) Br = 1.0 T, H = 3.5 mm.
图 9 (a) 三组对照结构的传输损失和平均速度; (b) 三组对照结构的传输损失和相位变化
Figure 9. Curves of (a) transmission loss and average velocity and (b) transmission loss and phase change for three different structures.
图 11 隔声峰/谷的声压云图(单位: Pa) (a) 无动态磁负刚度; (b) Br = 1.0 T, H = 4.0 mm; (c) Br = 1.0 T, H = 3.5 mm
Figure 11. Sound pressure cloud diagram at sound insulation peak/valley (unit: Pa): (a) Non-NS; (b) Br = 1.0 T, H = 4.0 mm; (c) Br = 1.0 T, H = 3.5 mm.
图 10 三组对照结构的传输损失和等效质量面密度曲线
Figure 10. Transmission loss and equivalent mass surface density curves of three different structures.
图 12 QZSMAMM的弹簧-质量等效模型
Figure 12. Spring-mass equivalent model of QZSMAMM.
图 13 剩余磁通密度保持不变(Br = 1.0 T), 传输损失随磁间隙的变化
Figure 13. Variation of transmission loss with magnetic gap fixed at Br = 1.0 T.
图 14 (a) 方位角
$\varphi = {0^ \circ }$ , 传输损失随入射角$\theta $ 的变化; (b) 入射角$\theta = {30^ \circ }$ , 传输损失随入射角$\varphi $ 的变化Figure 14. (a) Variation of transmission loss with incidence angle at
$\varphi = {0^ \circ }$ ; (b) variation of transmission loss with azimuth at$\theta = {30^ \circ }$ .
图 15 (a) 三种工况的传输损失对比(I: MAMM, II: QZSMAMM); (b) 三种工况的等效质量面密度对比(I: MAMM, II: QZSMAMM)
Figure 15. (a) Comparison of transmission loss curves among three working conditions (I: MAMM, II: QZSMAMM); (b) comparison of equivalent mass surface density curves among three working conditions (I: MAMM, II: QZSMAMM).
图 16 QZSMAMM单元的制备过程 (a) 施加薄膜张力; (b) 将中心贴敷有磁铁的张力薄膜粘接于支撑框架; (c) 添加外围磁铁; (d) 将样件置于阻抗管
Figure 16. Schematic of the preparation process of QZSMAMM unit: (a) Applying membrane tension; (b) tension membrane with a magnet applied to the center is bonded to the support frame; (c) adding peripheral magnets; (d) test sample positioned in impedance tube.
图 17 实验和有限元反演张力的传输损失对比
Figure 17. Comparison between experimentally measured and numerically predicted transmission loss versus frequency curves.
图 18 传输损失实验装置
Figure 18. Schematic of transmission loss experimental setup.
图 19 传输损失的实验测量与数值模拟对比
Figure 19. Comparison between experimentally measured and numerically predicted transmission loss versus frequency curves.
表 1 QZSMAMM单元几何参数和材料参数
Table 1. Geometric and material parameters of QZSMAMM unit.
Lx
/mmLy
/mmlx
/mmly
/mmt/mm t1/mm Br
/TT
/(N·m–1)${\rho _{{\text{mem}}}}$
/(kg·m–2)${\rho _{{\text{mag}}}}$/(kg·m–2) 40 40 5.32 5.32 0.2 2.0 1.0 500 0.24 15.6 
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表 2 理论和数值模拟的峰/谷频率
Table 2. Theoretical and numerical results for peak/valley frequencies.
Peak/valley frequency/Hz Non-NS Br = 1.0 T, H = 4.0 mm Br = 1.0 T, H = 3.5 mm Theory 435/297 336/143 281/86 FEM 432/295 325/130 270/95
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表 3 三种不同工况的结构参数和目标频率
Table 3. Structural parameters and target frequencies for three different operating conditions.
Configuration T/(N·m–1) Kmag/(N·m–1) f/Hz A I 400 0 386 II 500 –670 386 B I 200 0 274 II 400 –1300 274 C I 50 0 138 II 200 –970 138
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表 4 实验样件的相关材料参数
Table 4. Material parameters of experimental samples.
Density/
(kg·m–3)Young’s
modulus/GPaPoisson ratio Membrane 1200 1.8 0.38 Magnets 7594 200 0.29 Epoxy resin 1150 4.35 0.38
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表 5 实验和数值模拟的峰/谷频率
Table 5. Experimentally measured and numerically predicted peak/valley frequencies.
Peak/valley frequency/Hz T = 210 N/m T = 210 N/m T = 210 N/m T = 210 N/m d1 = 4.0 mm d2 = 3.8 mm d3 = 3.5 mm Experiment 286/208 268/140 262/118 259/104 FEM 286/211 264/178 259/167 251/158
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[1] Gao N S, Wu J G, Lu K, Zhong H B 2021 Mech. Syst. Sig. Process. 154 107504
Google Scholar
[2] Kang Z X, Song R X, Zhang H J, Liu Q 2021 Appl. Acoust. 174 107785
Google Scholar
[3] Ma G C, Sheng P 2016 Sci. Adv. 2 e1501595
Google Scholar
[4] Mei J, Ma G C, Yang M, Yang Z Y, Wen W J, Sheng P 2012 Nat. Commun. 3 756
Google Scholar
[5] Deng K, Ding Y Q, He Z J, Zhao H P, Shi J, Liu Z Y 2009 J. Appl. Phys. 105 124909
Google Scholar
[6] Peng S S, He Z J, Jia H, Zhang A Q, Qiu C Y, Ke M Z, Liu Z Y 2010 Appl. Phys. Lett. 96 263502
Google Scholar
[7] Zhu X F, Liang B, Kan W W, Zou X Y, Cheng J C 2011 Phys. Rev. Lett. 106 014301
Google Scholar
[8] Liu Z Y, Zhang X, Mao Y, Zhu Y Y, Yang Z, Chan C T, Sheng P 2000 Science 289 1734
Google Scholar
[9] Kushwaha M S, Halevi P, Dobrzynski L, Djafari-Rouhani B 1993 Phys. Rev. Lett. 71 2022
Google Scholar
[10] Gao N, Qu S C, Li J, Wang J, Chen W Q 2021 Int. J. Mech. Sci. 208 106695
Google Scholar
[11] Nguyen H, Wu Q, Xu X C, Chen H, Tracy S, Huang G L 2020 Appl. Phys. Lett. 117 134103
Google Scholar
[12] Demelofilho N G R, Claeys C, Deckers E, Desmet W 2020 Mech. Syst. Sig. Process. 139 106624
Google Scholar
[13] Xiao Y, Wen J H, Wen X S 2012 J. Sound Vib. 331 5408
Google Scholar
[14] Yang J, Lee J S, Lee H R, Kang Y J 2018 Appl. Phys. Lett. 112 091901
Google Scholar
[15] Zhao X Z, Liu G Q, Zhang C, Xia D, Lu Z M 2018 Appl. Phys. Lett. 113 074101
Google Scholar
[16] Wang X N, Zhou Y D, Sang J Q, Zhu W Y 2020 Appl. Acoust. 158 107045
Google Scholar
[17] Lin Q H, Lin Q L, Wang Y H, Di G Q 2021 Compos. Struct. 273 114312
Google Scholar
[18] Wang X L, Zhao H, Luo X D, Huang Z Y 2016 Appl. Phys. Lett. 108 041905
Google Scholar
[19] Langfeldt F, Riecken J, Gleine W, von Estorff O 2016 J. Sound Vib. 373 1
Google Scholar
[20] Langfeldt F, Kemsies H, Gleine W, von Estorff O 2017 Phys. Lett. A 381 1457
Google Scholar
[21] Li Y L, Zhang Y L, Xie S C 2020 Appl. Acoust. 168 107427
Google Scholar
[22] Xu Q S, Qiao J, Sun J Y, Zhang G Y, Li L Q 2021 J. Sound Vib. 493 115823
Google Scholar
[23] Yang Z Y, Mei J, Yang M, Chan N H, Sheng P 2008 Phys. Rev. Lett. 101 204301
Google Scholar
[24] Lu Z B, Yu X, Lau S K, Khoo B C, Cui F S 2020 Appl. Acoust. 157 107003
Google Scholar
[25] Li X Y, Zhao J J, Wang W J, Xing T, Zhu L Y, Liu Y N, Li X H 2022 Appl. Acoust. 187 108514
Google Scholar
[26] 贺子厚, 赵静波, 姚宏, 陈鑫 2019 68 214302
Google Scholar
He Z H, Zhao J B, Yao H, Chen X 2019 Acta Phys. Sin. 68 214302
Google Scholar
[27] Naify C J, Chang C M, McKnight G, Nutt S 2011 J. Appl. Phys. 110 124903
Google Scholar
[28] Tan X J, Wang B, Wang L C, Zhu S W, Chen S, Yao K L 2022 Compos. Struct. 286 115308
Google Scholar
[29] Wang K, Zhou J X, Cai C Q, Xu D L, Ouyang H J 2019 Appl. Math. Modell. 73 581
Google Scholar
[30] Yuan S J, Sun Y, Zhao J L, Meng K, Wang M, Pu H Y, Peng Y, Luo J, Xie S R 2020 J. Sound Vib. 482 115449
Google Scholar
[31] 胥强荣, 沈承, 韩峰, 卢天健 2021 70 244302
Google Scholar
Xu Q R, Shen C, Han F, Lu T J 2021 Acta Phys. Sin. 70 244302
Google Scholar
[32] Allag H, Yonnet J P 2009 Ieee. Trans. Magn. 45 3969
Google Scholar
[33] Oyelade A O, Chen Y, Zhang R J, Hu G K 2018 Int. J. Appl. Mech. 10 1850054
Google Scholar
[34] Wu J S, Luo S S 1997 J. Sound Vib. 200 179
Google Scholar
[35] 张光玉 2014 博士学位论文 (长沙: 国防科技大学)
Zhang G Y 2014 Ph. D. Dissertation (Changsha: National University of Defense Technology) (in Chinese)
[36] Meirovitch L 2001 Fundamentals of Vibrations (New York: McGraw-Hill Higher Education) pp529–530
[37] Lee J H, Kim J 2002 J. Sound Vib. 251 349
Google Scholar
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