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改进分析型嵌入原子法在W(100)表面声子谱中的应用

张晓军 王安祥 严祥安 陈长乐

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改进分析型嵌入原子法在W(100)表面声子谱中的应用

张晓军, 王安祥, 严祥安, 陈长乐

Application of the modified analytic embedded atomic method in W(100) surface phonon spectrum

Zhang Xiao-Jun, Wang An-Xiang, Yan Xiang-An, Chen Chang-Le
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  • 在表面晶格动力学理论的框架下, 采用改进分析型嵌入原子法模型模拟W(100)表面沿$\bar \varGamma \bar L$$\bar L\bar M$$\bar \Gamma \bar M$对称方向上的声子色散频谱, 并计算不同对称点处的极化矢量. 按照表面模的判定依据和标记方法绘制不同对称方向上的表面模, 并讨论表面模的分布范围和模式耦合现象. 基于计算所得的极化矢量, 构建近表面原子层的振动态分布, 分析不同对称方向上表面模的局域特征和极化方式. 以极化矢量为考察对象, 直观、形象地展示了表面模色散支之间的避免交叉现象和独立性实交叉现象.
    Based on the theory of surface lattice dynamics, the surface phonon spectrums along three symmetrical directions of $\bar \varGamma \bar L$, $\bar L\bar M$ and $\bar \varGamma \bar M$ are simulated for the W(100) surface by using the modified analytic embedded atom method. The polarization vectors at different symmetrical points are also calculated. According to the criterion and marking method of surface mode, the surface modes along different symmetrical directions are drawn, the distribution range and mode coupling of surface modes are discussed as well. The vibration frequencies of surface modes calculated by us have been compared to available experimental datum and some theoretical values correspondingly. The results display that the present results are general agreement with the referenced experimental or theoretical results. Based on the calculated polarization vector, the surface vibration states are constructed for the atomic layers in the neighboring surface. And the polarization and local features of the surface modes along different symmetrical directions are analyzed. The results show that there are some coupling phenomena between surface mode dispersion, such as avoid crossing and independence crossing. The avoid crossing is found between the surface-mode branch S1 and the surface-mode branch S2 near ${\bar \zeta _y} = 0.32$ along $\bar L\bar M$ direction. In the region, going from $\bar L$ to $\bar M$, S1 changes from y polarization to z polarization, and S2 changes from z polarization to y polarization. The independence crossings exist between surface-mode branch S1 and surface-mode branch S2 at ${\bar \zeta _x} = 0.5$ along $\bar \varGamma \bar L$ direction, and surface-mode branch S2 and surface-mode branch S3 at ${\bar \zeta _x} = 0.5$ along $\bar L\bar M$ direction, respectively. Before and after the crossings, the polarization and local features of the surface modes have not changed. Inspection of the polarization vectors, the coupling phenomena are iconically demonstrated.
      通信作者: 张晓军, xiaoj_zhang@126.com
    • 基金项目: 国际级- 基于原子相干的非线性级联效应控制光孤子传输(61405151)
      Corresponding author: Zhang Xiao-Jun, xiaoj_zhang@126.com
    [1]

    Bagci S, Duman S, Mutuncu H M, Srivastava G P 2009 J. Phys. Chem. Solids 70 444Google Scholar

    [2]

    Barrett C, Wang L W 2016 Comp. Phys. Commun. 200 27Google Scholar

    [3]

    Campi D, Bmasconi M, Benedek G, Graham A P, Toennies J P 2017 Phys. Chem. Chem. Phys. 19 16358Google Scholar

    [4]

    Hayes W W, Amjad A T, Anemone G, Manson J R 2018 Surf. Sci. 678 20Google Scholar

    [5]

    Taleb A A, Anemone G, Farias D, Miranda R 2016 Carbon 99 416Google Scholar

    [6]

    Anton T, Patrick K, Michael M R, Davide C, Marco B 2013 Phys. Rev. B 87 035410Google Scholar

    [7]

    Minamitani E, Takagi N, Arafune R, Thomas F, Komeda T 2018 Prog. Surf. Sci. 93 131Google Scholar

    [8]

    Matsushita S Y, Hu C, Kawamoto E, Kato H, Watanabe K, Suto S 2015 J. Chem. Phys. 143 214702Google Scholar

    [9]

    Hu G, Huang J Q, Wang Y N, Yang T, Dong B J, Wang J Z, Zhao B, Ali S, Zhang Z D 2018 Chin. Phys. B 27 086301Google Scholar

    [10]

    Chen Y, Tong S Y, Kim J S, Kesmodel L L, Rodach T, Bohnen K P, Ho K M 1991 Phys. Rev. B 44 11394Google Scholar

    [11]

    Benedek G, Ellis J, Luo N S, Reichmuth A, Ruggerone P, Toennies J P 1993 Phys. Rev. B 48 4917Google Scholar

    [12]

    杨剑瑜, 邓辉球, 胡望宇 2004 物理学报 53 1946Google Scholar

    Yang J Y, Deng H Q, Hu W Y 2004 Acta Phys. Sin. 53 1946Google Scholar

    [13]

    Yndurain F, Jigato M P 2008 Phys. Rev. Let. 100 205501Google Scholar

    [14]

    Łażewski J, Korecki J, Parlinski K 2007 Phys. Rev. B 75 054303

    [15]

    Benedek G, Bernasconi M, Chis V, Chulkov E, Echenique P M, Hellsing B, Toennies J P 2010 J. Phys.: Condens. Matter 22 084020Google Scholar

    [16]

    Rusina G G, Borisova S D, Chulkov EV 2016 J. Exp. Theor. Phys. 122 283

    [17]

    Allen R E, Allredge G P, Wette F W 1971 Phys. Rev. B 4 1648Google Scholar

    [18]

    Allen R E, Allredge G P, Wette F W 1971 Phys. Rev. B 4 1661Google Scholar

    [19]

    Ouyang Y F, Zhang B W, Liao S Z, Jin Z P 1996 Z Phys. B 101 161Google Scholar

    [20]

    Zhang B W, Ouyang Y F, Liao S Z, Jin Z P 1999 Phys. B 262 218Google Scholar

    [21]

    Hu W Y, Shu X L, Zhang B W 2002 Comp. Mater. Sci. 23 175Google Scholar

    [22]

    Luo W H, Hu W Y, Su K L, Liu F S 2013 Appl. Surf. Sci. 265 375Google Scholar

    [23]

    Jin H S, Pak J Y, Jong Y S 2017 Appl. Phys. A 123 257

    [24]

    Zhang X J, Chen C L, Feng F L 2013 Chin. Phys. B 22 096301Google Scholar

    [25]

    Fasolino A, Tosatti E 1987 Phys. Rev. B 35 4264Google Scholar

    [26]

    Zhang X J, Chen C L 2016 Chin. Phys. B 25 016301Google Scholar

    [27]

    Nelson J S, Sowa E C, Murray S D 1988 Phys. Rev. Let. 61 1977Google Scholar

    [28]

    Ernst H J, Hulpke E, Toennies J P 1992 Phys. Rev. B 46 16081Google Scholar

    [29]

    Joubert D P 1988 J. Phys. C: Solid State Phys. 21 4233Google Scholar

    [30]

    Sklyadneva I Y, Rusina G G, Chulkov E V 1998 Surf. Sci. 416 17Google Scholar

    [31]

    Heid R, Bohnen K P 2003 Phys. Rep. 387 151Google Scholar

  • 图 1  W(100)表面结构 (a)正格点阵; (b)倒格点阵

    Fig. 1.  Surface structure of W (100): (a) Crystal lattice; (b) reciprocal lattice.

    图 2  W(100)表面声子谱

    Fig. 2.  Surface phonon spectrum of W(100)

    图 3  W(100)表面模分布

    Fig. 3.  Surface mode distribution of W(100).

    图 4  S1表面模的计算结果和实验值的比较

    Fig. 4.  Comparison of calculated S1 surface mode and experimental value.

    图 5  W(100)近表面原子层沿$\bar \varGamma \bar L$对称方向的局域振动态密度 (a)第1原子层; (b)第2原子层; (c)第3原子层; (d)第4原子层

    Fig. 5.  Local vibrational state density of atomic layers in the vicinity of the W (100) surface along $\bar \varGamma \bar L$ symmetry direction: (a) First atomic layer; (b) second atomic layer; (c) third atomic layer; (d) fourth atomic layer.

    图 6  W(100)近表面原子层沿$\bar \varGamma \bar L$对称方向的极化态密度 (a)第1原子层沿x方向极化; (b)第1原子层沿y方向极化; (c)第1原子层沿z方向极化; (d)第2原子层沿x方向极化; (e)第2原子层沿y方向极化; (f)第2原子层沿z方向极化

    Fig. 6.  Polarizing state density of atomic layers in the vicinity of the W (100) surface along $\bar \varGamma \bar L$ symmetry direction: (a) x polarization for first atomic layer; (b) y polarization for first atomic layer; (c) z polarization for first atomic layer; (d) x polarization for second atomic layer; (e) y polarization for second atomic layer; (f) z polarization for second atomic layer.

    图 7  W(100)近表面原子层沿$\bar L\bar M$方向上的局域振动态密度 (a)第1原子层; (b)第2原子层; (c)第3原子层; (d)第4原子层

    Fig. 7.  Local vibrational state density of atomic layers in the vicinity of the W (100) surface along $\bar L\bar M$ symmetry direction: (a) First atomic layer; (b) second atomic layer; (c) third atomic layer; (d) fourth atomic layer.

    图 8  W(100)近表面原子层沿$\bar L\bar M$方向的极化态密度 (a)第1原子层沿x方向极化; (b)第1原子层沿y方向极化; (c)第1原子层沿z方向极化; (d)第2原子层沿x方向极化; (e)第2原子层沿y方向极化; (f)第2原子层沿z方向极化

    Fig. 8.  Polarizing state density of atomic layers in the vicinity of the W (100) surface along $\bar L\bar M$ symmetry direction: (a) x polarization for first atomic layer; (b) y polarization for first atomic layer; (c) z polarization for first atomic layer; (d) x polarization for second atomic layer; (e) y polarization for second atomic layer; (f) z polarization for second atomic layer.

    图 9  W(100)近表面原子层沿$\bar \Gamma \bar M$方向上的局域振动态密度 (a)第1原子层; (b)第2原子层

    Fig. 9.  Local vibration state density of atomic layers in the vicinity of the W (100) surface along $ \bar \Gamma \bar M $ symmetry direction: (a) First atomic layer; (b) second atomic layer.

    图 10  W(100)近表面原子层沿$\bar \varGamma \bar M$方向的极化态密度 (a)第1原子层沿x方向极化; (b)第1原子层沿y方向极化; (c)第1原子层沿z方向极化; (d)第2原子层沿x方向极化; (e)第2原子层沿y方向极化; (f)第2原子层沿z方向极化

    Fig. 10.  Polarizing state density of atomic layers in the vicinity of the W (100) surface along $\bar \varGamma \bar M$ symmetry direction: (a) x polarization for first atomic layer; (b) y polarization for first atomic layer; (c) z polarization for first atomic layer; (d) x polarization for second atomic layer; (e) y polarization for second atomic layer; (f) z polarization for second atomic layer.

    表 1  高对称点处W(100)表面模振动频率的比较 (单位: THz)

    Table 1.  Comparison of vibration frequencies of surface modes for W(100) at high symmetry points (in units of THz).

    Method$\bar L$$\bar M$
    S1S2S3S6S1S3
    MAEAM2.633.083.335.033.443.91
    EHA2.772.983.465.313.273.99
    TBM3.213.343.815.063.463.93
    下载: 导出CSV
  • [1]

    Bagci S, Duman S, Mutuncu H M, Srivastava G P 2009 J. Phys. Chem. Solids 70 444Google Scholar

    [2]

    Barrett C, Wang L W 2016 Comp. Phys. Commun. 200 27Google Scholar

    [3]

    Campi D, Bmasconi M, Benedek G, Graham A P, Toennies J P 2017 Phys. Chem. Chem. Phys. 19 16358Google Scholar

    [4]

    Hayes W W, Amjad A T, Anemone G, Manson J R 2018 Surf. Sci. 678 20Google Scholar

    [5]

    Taleb A A, Anemone G, Farias D, Miranda R 2016 Carbon 99 416Google Scholar

    [6]

    Anton T, Patrick K, Michael M R, Davide C, Marco B 2013 Phys. Rev. B 87 035410Google Scholar

    [7]

    Minamitani E, Takagi N, Arafune R, Thomas F, Komeda T 2018 Prog. Surf. Sci. 93 131Google Scholar

    [8]

    Matsushita S Y, Hu C, Kawamoto E, Kato H, Watanabe K, Suto S 2015 J. Chem. Phys. 143 214702Google Scholar

    [9]

    Hu G, Huang J Q, Wang Y N, Yang T, Dong B J, Wang J Z, Zhao B, Ali S, Zhang Z D 2018 Chin. Phys. B 27 086301Google Scholar

    [10]

    Chen Y, Tong S Y, Kim J S, Kesmodel L L, Rodach T, Bohnen K P, Ho K M 1991 Phys. Rev. B 44 11394Google Scholar

    [11]

    Benedek G, Ellis J, Luo N S, Reichmuth A, Ruggerone P, Toennies J P 1993 Phys. Rev. B 48 4917Google Scholar

    [12]

    杨剑瑜, 邓辉球, 胡望宇 2004 物理学报 53 1946Google Scholar

    Yang J Y, Deng H Q, Hu W Y 2004 Acta Phys. Sin. 53 1946Google Scholar

    [13]

    Yndurain F, Jigato M P 2008 Phys. Rev. Let. 100 205501Google Scholar

    [14]

    Łażewski J, Korecki J, Parlinski K 2007 Phys. Rev. B 75 054303

    [15]

    Benedek G, Bernasconi M, Chis V, Chulkov E, Echenique P M, Hellsing B, Toennies J P 2010 J. Phys.: Condens. Matter 22 084020Google Scholar

    [16]

    Rusina G G, Borisova S D, Chulkov EV 2016 J. Exp. Theor. Phys. 122 283

    [17]

    Allen R E, Allredge G P, Wette F W 1971 Phys. Rev. B 4 1648Google Scholar

    [18]

    Allen R E, Allredge G P, Wette F W 1971 Phys. Rev. B 4 1661Google Scholar

    [19]

    Ouyang Y F, Zhang B W, Liao S Z, Jin Z P 1996 Z Phys. B 101 161Google Scholar

    [20]

    Zhang B W, Ouyang Y F, Liao S Z, Jin Z P 1999 Phys. B 262 218Google Scholar

    [21]

    Hu W Y, Shu X L, Zhang B W 2002 Comp. Mater. Sci. 23 175Google Scholar

    [22]

    Luo W H, Hu W Y, Su K L, Liu F S 2013 Appl. Surf. Sci. 265 375Google Scholar

    [23]

    Jin H S, Pak J Y, Jong Y S 2017 Appl. Phys. A 123 257

    [24]

    Zhang X J, Chen C L, Feng F L 2013 Chin. Phys. B 22 096301Google Scholar

    [25]

    Fasolino A, Tosatti E 1987 Phys. Rev. B 35 4264Google Scholar

    [26]

    Zhang X J, Chen C L 2016 Chin. Phys. B 25 016301Google Scholar

    [27]

    Nelson J S, Sowa E C, Murray S D 1988 Phys. Rev. Let. 61 1977Google Scholar

    [28]

    Ernst H J, Hulpke E, Toennies J P 1992 Phys. Rev. B 46 16081Google Scholar

    [29]

    Joubert D P 1988 J. Phys. C: Solid State Phys. 21 4233Google Scholar

    [30]

    Sklyadneva I Y, Rusina G G, Chulkov E V 1998 Surf. Sci. 416 17Google Scholar

    [31]

    Heid R, Bohnen K P 2003 Phys. Rep. 387 151Google Scholar

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出版历程
  • 收稿日期:  2019-12-17
  • 修回日期:  2020-01-22
  • 刊出日期:  2020-04-05

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