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基于能量转换原理的磁电层合材料低频磁电响应分析

代显智

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基于能量转换原理的磁电层合材料低频磁电响应分析

代显智

Low frequency magnetoelectric response analysis of magnetoelectric laminate material based on energy conversion principle

Dai Xian-Zhi
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  • 提出了一种基于能量转换原理的磁致伸缩/压电层合材料低频磁电响应模型,并对不同层合结构的磁电响应特性进行了对比研究. 该模型假定层合材料层间能量传递通过层间剪切力来实现,利用应力函数法分析了磁致伸缩层和压电层的应力与应变,求出了磁致伸缩层的应变能和存储磁场能以及压电层的应变能和电场能;利用Hamilton最小能量原理求出了层间剪切力的大小,获得了开路状态下层合材料的低频磁电响应模型. 发现磁电电压系数与磁致伸缩材料的磁导率、泊松比、磁机耦合系数以及压电材料的泊松比、机电耦合系数等有关,并对这些参数的影响进行了分析. 同时对两层和三层结构的层合材料磁电特性进行了对比研究,发现层合结构不同则获得的磁电系数公式不同,用相应的公式计算得到的误差才会最小. 研究结果表明,本文的理论误差小于6.5%,与其他方法相比,本文的理论模型能更好地描述磁电层合材料的低频磁电响应特性.
    A low frequency magnetoelectric (ME) response model of magnetostrictive/piezoelectric laminate composite is presented based on energy conversion principle, and ME response characteristics of different laminate structures are compared in this paper. In this model it is assumed that the energy transfer between the layers of the composite laminates is achieved by the interlayer shear force. The stresses and strains of the magnetostrictive and piezoelectric layers are analyzed by the stress function method. While the strain and stored magnetic energy of magnetostrictive layers and the strain and electric field energy of piezoelectric layers are solved. Under open-circuit conditions, the interlayer shear force and the low frequency ME response model of laminate composites are obtained by using Hamilton principle of minimum energy. The theoretical results show that the ME voltage coefficient is related to the Poisson ratio, magnetic permeability, magnetomechanical coupling coefficient of magnetostrictive material, Poisson ratio, and electromechanical coupling coefficient of piezoelectric material. The influences of these parameters are analyzed. The magnetoelectric characteristics of two- and three-tier laminated structures are compared in this paper, showing that different laminated structures have different formulas for ME coefficient and calculation errors will be smaller when the corresponding ME coefficient formula is used. The experimental results show that the analytical error is smaller than 6% and the model can better describe the low frequency ME response characteristics of laminated magnetoelectric materials.
    • 基金项目: 国家自然科学基金(批准号:61074177)、四川省教育厅科研基金(批准号:11ZA037,12ZB148)、西华师范大学科研启动基金(批准号:11B006)和西华师范大学创新团队基金资助的课题.
    • Funds: Project supported by the National Natural Science Foundation of China (Grant No. 61074177), the Scientific Research Foundation of the Education Department of Sichuan Province, China (Grant Nos. 11ZA037, 12ZB148), the Scientific Research Foundation of China West Normal University (Grant No. 11B006), and the Innovative Research Team Foundation of China West Normal University.
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    [3]

    Chen L, Li P, Wen Y M, Zhu Y 2013 Chin. Phys. B 22 077505

    [4]

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    [5]

    Yu X J, Wu T Y, Li Z 2013 Acta Phys. Sin. 62 058503 (in Chinese) [于歆杰, 吴天逸, 李臻 2013 物理学报 62 058503]

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    [8]

    Zhou H M, Chen Q, Deng J H 2014 Chin. Phys. B 23 047502

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    Filippov D A 2005 Phys. Solid State 47 1082

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    Nan C W 1994 Phys. Rev. B 50 6082

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    Nan C W, Clarke D R 2005 J. Am. Ceram. Soc. 80 1333

    [12]

    Dong S, Li J F, Viehland D 2003 IEEE Trans. Ultrason. Ferroelectr. Freq. Control. 50 1253

    [13]

    Dong S, Li J, Viehland D 2003 IEEE Trans. Ultrason. Ferroelectr. Freq. Control. 50 1236

    [14]

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    [15]

    Harshe G, Dougherty J P, Newnham R E 1993 Int. J. Appl. Electromagn. Mater. 4 145

    [16]

    Yang J, Wen Y M, Li P, Dai X Z 2009 Proceedings of Micro and Nanotechnology for Power Generation and Energy Conversion Applications Washington, USA, December 1-4, 2009 p352

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    Cui X, Dong S 2011 J. Appl. Phys. 109 083903

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    Chang C M, Carman G 2007 Phys. Rev. B 76 134116

    [20]

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    Bichurin M I, Petrov V M, Srinivasan G 2002 J. Appl. Phys. 92 7681

    [22]

    Xu Z L 2006 Elasticity (Vol. 1) (4th Ed.) (Beijing: Higher Education Press) p32 (in Chinese) [徐芝纶 2006 弹性力学 (上册) (第四版) (北京: 高等教育出版社) 第32页]

    [23]

    Dong S, Zhai J, Xing Z, Li J, Viehland D 2007 Appl. Phys. Lett. 91 022915

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    Zhai J, Xing Z, Dong S, Li J, Viehland D 2006 Appl. Phys. Lett. 88 062510

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出版历程
  • 收稿日期:  2014-04-09
  • 修回日期:  2014-06-13
  • 刊出日期:  2014-10-05

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