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旋转方形散射体对三角晶格磁振子晶体带结构的优化

胡晓颖 郭晓霞 胡文弢 呼和满都拉 郑晓霞 荆丽丽

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旋转方形散射体对三角晶格磁振子晶体带结构的优化

胡晓颖, 郭晓霞, 胡文弢, 呼和满都拉, 郑晓霞, 荆丽丽

Spin-wave band gaps created by rotating square rods in triangular lattice magnonic crystals

Hu Xiao-Ying, Guo Xiao-Xia, Hu Wen-Tao, Huhe Mandula, Zheng Xiao-Xia, Jing Li-Li
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  • 用改进的平面波展开法数值计算了正方形散射体三角排列的二维磁振子晶体当散射体旋转时的带结构. 结果显示, 同样的填充率下, 旋转正方柱散射体可以在新的频率范围内打开更多的带隙, 或者使低频带隙加宽. 说明旋转散射体可以有效地优化带隙.
    Recently, magnonic crystals which are the magnetic counterparts of photonic crystals or phononic crystals are becoming a hot area of research. In this paper, band structure of two-dimensional magnotic crystal composed of square rods triangularly arranged are calculated by using the plane-wave expansion method. Spin-wave band structures of two-dimensional magnonic crystal composed of Fe triangularly arranged Fe in an EuO matrix. The results show that when the filling ratio f=0.4, only two absolute band gaps can be found in the case of θ=0°. The first gap appears between the first band and the second band, the second gap between the sixth band and the seventh band. However, the number of band gaps can be improved by rotating the square rods through θ=25°, there are eight absolute band gaps that can be found. The first gap appears between the first band and the second band, the fifth gap between the sixth band and the seventh band. The new band gaps can be found, the second gap appears between the third band and the fourth band, the third gap between the fourth band and the fifth band, the fourth gap between the fifth band and the sixth band, the sixth gap between the seventh band and the eighth band, the seventh gap between the eighth band and the ninth band, the eighth gap between the ninth band and the tenth band. These results show that it is possible to create spin-wave gaps by rotating square rods in a two-dimensional magnotic crystal. The numerical results of the normalized gap width ΔΩ/Ωg of the first gap between the first band and the second band always changes with filling fraction f and rotational angles θ. When f=0.6 we calculated the first normalized gap width ΔΩ/Ωg. when f=0.6 and θ=0°, the first gap width ΔΩ=0.812(μ0ω/g) and the normalized gap width ΔΩ/Ωg=0.9187. The results show that from the first normalized gap widths the largest one can be found when f=0.6 and θ=5°, the first gap width ΔΩ=0.937(μ0ω/g) and the normalized gap width ΔΩ/Ωg=0.9591. The results show that the numerical, rotating square rods can make the low frequency band gap widen in the triangular lattice of two-dimensional magnonic crystal.
    • 基金项目: 内蒙古自治区高等学校科学技术研究项目(批准号: NJZY13281)资助的课题.
    • Funds: Project supported by the Higher School Science and Technology Research Projects of Inner Mongolia, China (Grant No. NJZY13281).
    [1]

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    Mamica S, Krawczyk M, Klos J W 2012 Adv. Cond. Mat. Phys. 2012 161387

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    Wang Z K, Zhang V L, Lim H S, Ng S C, Kuok M H, Jain S, Adeyeye A O 2009 Appl. Phys. Lett. 94 083112

    [6]

    Wang Z K, Zhang V L, Lim H S, Ng S C, Kuok M H, Jain S, Adeyeye A O 2010 ACS Nano 4 643

    [7]

    Krawczyk M, Puszkarski H 2008 Phys. Rev. B 77 054437

    [8]

    Kuchko A N, Sokolovskii M L, Kruglyak V V 2005 Physica B 370 73

    [9]

    Kruglyak V V, Sokolovskii M L, Tkachenko V S, Kuchko A N 2006 J. Appl. Phys. 99 08C906

    [10]

    Cao Y J, Yun G H, Narisu 2011 Acta Phys. Sin. 60 077502 (in Chinese) [曹永军, 云国宏, 那日苏 2011 物理学报 60 077502]

    [11]

    Yang H, Yun G H, Cao Y J 2011 J. Phys. D: Appl. Phys. 44 455001

    [12]

    Cao Y J, Yun G H, Liang X X, Ban N 2010 J. Phys. D: Appl. Phys. 43 305005

    [13]

    Hu X Y, Huhe M, Cao Y J 2014 Acta Phys. Sin. 63 147501 (in Chinese) [胡晓颖, 呼和满都拉, 曹永军 2014 物理学报 63 147501]

    [14]

    Puszkarski H, Krawczyk M 2003 Solid State Phenom. 94 125

    [15]

    Kruglyak V V, Kuchko A N 2001 Phys. Met. Metallogr. 92 211

    [16]

    Liu J 2014 Chin. Phys. B 23 047503

    [17]

    Kumar D, Klos J W, Krawczyk M, Barman A 2014 J. Appl. Phys. 115 043917

  • [1]

    Krawczyk M, Puszkarski H 2008 Phys. Rev. B 77 054437

    [2]

    Tacchi S, Duerr G, Klos J W, Madami M, Neusser S, Gubbiotti G, Carlotti G, Krawczyk M, Grundler D 2012 Phys. Rev. Lett. 109 137202

    [3]

    Mamica S, Krawczyk M, Klos J W 2012 Adv. Cond. Mat. Phys. 2012 161387

    [4]

    Krawczyk M, Klos J W, Sokolovskyy L, Madami M 2010 J. Appl. Phys. 108 093909

    [5]

    Wang Z K, Zhang V L, Lim H S, Ng S C, Kuok M H, Jain S, Adeyeye A O 2009 Appl. Phys. Lett. 94 083112

    [6]

    Wang Z K, Zhang V L, Lim H S, Ng S C, Kuok M H, Jain S, Adeyeye A O 2010 ACS Nano 4 643

    [7]

    Krawczyk M, Puszkarski H 2008 Phys. Rev. B 77 054437

    [8]

    Kuchko A N, Sokolovskii M L, Kruglyak V V 2005 Physica B 370 73

    [9]

    Kruglyak V V, Sokolovskii M L, Tkachenko V S, Kuchko A N 2006 J. Appl. Phys. 99 08C906

    [10]

    Cao Y J, Yun G H, Narisu 2011 Acta Phys. Sin. 60 077502 (in Chinese) [曹永军, 云国宏, 那日苏 2011 物理学报 60 077502]

    [11]

    Yang H, Yun G H, Cao Y J 2011 J. Phys. D: Appl. Phys. 44 455001

    [12]

    Cao Y J, Yun G H, Liang X X, Ban N 2010 J. Phys. D: Appl. Phys. 43 305005

    [13]

    Hu X Y, Huhe M, Cao Y J 2014 Acta Phys. Sin. 63 147501 (in Chinese) [胡晓颖, 呼和满都拉, 曹永军 2014 物理学报 63 147501]

    [14]

    Puszkarski H, Krawczyk M 2003 Solid State Phenom. 94 125

    [15]

    Kruglyak V V, Kuchko A N 2001 Phys. Met. Metallogr. 92 211

    [16]

    Liu J 2014 Chin. Phys. B 23 047503

    [17]

    Kumar D, Klos J W, Krawczyk M, Barman A 2014 J. Appl. Phys. 115 043917

计量
  • 文章访问数:  4780
  • PDF下载量:  527
  • 被引次数: 0
出版历程
  • 收稿日期:  2014-11-08
  • 修回日期:  2015-01-02
  • 刊出日期:  2015-05-05

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