Geometric influences of a particle confined to a curved surface embedded in three-dimensional Euclidean space

被引:39
|
作者
Wang, Yong-Long [1 ,2 ,3 ]
Jiang, Hua [3 ]
Zong, Hong-Shi [4 ,5 ,6 ]
机构
[1] Nanjing Univ, Dept Mat Sci & Engn, Natl Lab Solid State Microstruct, Nanjing 210093, Jiangsu, Peoples R China
[2] Nanjing Univ, Collaborat Innovat Ctr Adv Microstruct, Nanjing 210093, Jiangsu, Peoples R China
[3] Linyi Univ, Sch Phys & Elect Engn, Linyi 276005, Peoples R China
[4] Nanjing Univ, Dept Phys, Nanjing 210093, Jiangsu, Peoples R China
[5] Joint Ctr Particle Nucl Phys & Cosmol, Nanjing 210093, Jiangsu, Peoples R China
[6] Chinese Acad Sci, Inst Theoret Phys, State Key Lab Theoret Phys, Beijing 100190, Peoples R China
来源
PHYSICAL REVIEW A | 2017年 / 96卷 / 02期
基金
中国国家自然科学基金;
关键词
QUANTUM-MECHANICS; CURVATURE; MOTION; SPIN;
D O I
10.1103/PhysRevA.96.022116
中图分类号
O43 [光学];
学科分类号
070207 ; 0803 ;
摘要
In the spirit of the thin-layer quantization approach, we give the formula of the geometric influences of a particle confined to a curved surface embedded in three-dimensional Euclidean space. The geometric contributions can result from the reduced commutation relation between the acted function depending on normal variable and the normal derivative. According to the formula, we obtain the geometric potential, geometric momentum, geometric orbital angular momentum, geometric linear Rashba, and cubic Dresselhaus spin-orbit couplings. As an example, a truncated cone surface is considered. We find that the geometric orbital angular momentum can provide an azimuthal polarization for spin, and the sign of the geometric Dresselhaus spin-orbit coupling can be flipped through the inclination angle of generatrix.
引用
收藏
页数:10
相关论文
共 50 条
  • [41] Algorithms for the construction of an optimal cover for sets in three-dimensional Euclidean space
    V. N. Ushakov
    P. D. Lebedev
    Proceedings of the Steklov Institute of Mathematics, 2016, 293 : 225 - 237
  • [42] Plane Formation by Synchronous Mobile Robots in the Three-Dimensional Euclidean Space
    Yamauchi, Yukiko
    Uehara, Taichi
    Kijima, Shuji
    Yamashita, Masafumi
    JOURNAL OF THE ACM, 2017, 64 (03)
  • [43] Algorithms for the construction of an optimal cover for sets in three-dimensional Euclidean space
    Ushakov, V. N.
    Lebedev, P. D.
    TRUDY INSTITUTA MATEMATIKI I MEKHANIKI URO RAN, 2015, 21 (02): : 276 - 288
  • [44] 4π radiotherapy using a linear accelerator: A misnomer in violation of the solid geometric boundary conditions in three-dimensional Euclidean space
    Sarkar, Biplab
    Ganesh, Tharmarnadar
    Munshi, Anusheel
    Manikandan, Arjunan
    Mohanti, BidhuKalyan
    JOURNAL OF MEDICAL PHYSICS, 2019, 44 (04) : 283 - 286
  • [45] Geometric percolation thresholds of interpenetrating plates in three-dimensional space
    Yi, Y. B.
    Tawerghi, E.
    PHYSICAL REVIEW E, 2009, 79 (04):
  • [46] Three-Dimensional Single Particle Tracking and Its Applications in Confined Environments
    Zhong, Yaning
    Wang, Gufeng
    ANNUAL REVIEW OF ANALYTICAL CHEMISTRY, VOL 13, 2020, 13 : 381 - 403
  • [47] Visualizing Human Genes on Manifolds Embedded in Three-Dimensional Space
    Cheng, Wei-Chen
    INTELLIGENT INFORMATION AND DATABASE SYSTEMS (ACIIDS 2012), PT II, 2012, 7197 : 421 - 430
  • [48] The Symmetry and Topology of Finite and Periodic Graphs and Their Embeddings in Three-Dimensional Euclidean Space
    O'Keeffe, Michael
    Treacy, Michael M. J.
    SYMMETRY-BASEL, 2022, 14 (04):
  • [49] (ζ-m, ζm)-Type Algebraic Minimal Surfaces in Three-Dimensional Euclidean Space
    Guler, Erhan
    Kisi, Omer
    AXIOMS, 2022, 11 (01)
  • [50] Finite Dimension Modulation Design with Polarization Diversity in Three-Dimensional Euclidean Space
    Wong, Tze C.
    Kwon, Hyuck M.
    2011 IEEE VEHICULAR TECHNOLOGY CONFERENCE (VTC FALL), 2011,
12345