[1] |
HERBERT G, POOLE C P, SAFKO J L. Classical Mechanics[M]. Boston, MA: Addison Wesley, 2002.
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[2] |
TAYLOR J R. Classical Mechanics[M]. Herndon, VA: University Science Books, 2005.
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[3] |
STECHER J V, GREENE C H. Correlated Gaussian hyperspherical method for few-body systems[J]. Physical Review A, 2009, 80(2): 022504.
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[4] |
LACOURSIERE C, LINDE M. Spook: a variational time-stepping scheme for rigid multibody systems subject to dry frictional contacts[R]. Ume, Sweden: Ume University, 2014.
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[5] |
LOU Zhimei. Normal coordinates and normal vibration modals of multidimension free vibration[J]. Mechanics in Engineering, 2002, 24(6): 50-53. (in Chinese)
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[6] |
LOU Zhimei. The common method of finding normal coordinate for the multidimensional linear microvibration[J]. College Physics, 2004, 23(7): 3-7, 31.(in Chinese)
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[7] |
KONISHI K, PAFFUTI G. A theorem on cyclic harmonic oscillators[J]. International Journal of Modern Physics A, 2004, 21(15):3199-3211.
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[8] |
TOMIYA M, YOSHINAGA N. Numerical analysis of level statistical properties of two- and three-dimensional coupled quartic oscillators[J]. Computer Physics Communications, 2001, 142(1): 82-87.
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[9] |
JI Yinghua, LEI Minsheng. Diagonalization of Hamiltonian for three harmonically coupled non-identical oscillators[J]. College Physics, 2001, 20(10): 24-25. (in Chinese)
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[10] |
LINDENFELD Z, EISENBERG E, LIFSHITZ R. Phonon-mediated damping of mechanical vibrations in a finite atomic chain coupled to an outer environment[EB/OL]. [2018-03-01] https://arxiv.org/abs/1309.5772.
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[11] |
FAN H Y, LU H L, FAN Y. Newton-Leibniz integration for ket-bra operators in quantum mechanics and derivation of entangled state representations[J]. Ann Phys, 2006, 321: 480-494.
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[12] |
FAN H Y, LI C. Invariant ‘eigen-operator’ of the square of Schrdinger operator for deriving energy-level gap[J]. Phys Lett A, 2004, 321: 75-78.)
|
[1] |
HERBERT G, POOLE C P, SAFKO J L. Classical Mechanics[M]. Boston, MA: Addison Wesley, 2002.
|
[2] |
TAYLOR J R. Classical Mechanics[M]. Herndon, VA: University Science Books, 2005.
|
[3] |
STECHER J V, GREENE C H. Correlated Gaussian hyperspherical method for few-body systems[J]. Physical Review A, 2009, 80(2): 022504.
|
[4] |
LACOURSIERE C, LINDE M. Spook: a variational time-stepping scheme for rigid multibody systems subject to dry frictional contacts[R]. Ume, Sweden: Ume University, 2014.
|
[5] |
LOU Zhimei. Normal coordinates and normal vibration modals of multidimension free vibration[J]. Mechanics in Engineering, 2002, 24(6): 50-53. (in Chinese)
|
[6] |
LOU Zhimei. The common method of finding normal coordinate for the multidimensional linear microvibration[J]. College Physics, 2004, 23(7): 3-7, 31.(in Chinese)
|
[7] |
KONISHI K, PAFFUTI G. A theorem on cyclic harmonic oscillators[J]. International Journal of Modern Physics A, 2004, 21(15):3199-3211.
|
[8] |
TOMIYA M, YOSHINAGA N. Numerical analysis of level statistical properties of two- and three-dimensional coupled quartic oscillators[J]. Computer Physics Communications, 2001, 142(1): 82-87.
|
[9] |
JI Yinghua, LEI Minsheng. Diagonalization of Hamiltonian for three harmonically coupled non-identical oscillators[J]. College Physics, 2001, 20(10): 24-25. (in Chinese)
|
[10] |
LINDENFELD Z, EISENBERG E, LIFSHITZ R. Phonon-mediated damping of mechanical vibrations in a finite atomic chain coupled to an outer environment[EB/OL]. [2018-03-01] https://arxiv.org/abs/1309.5772.
|
[11] |
FAN H Y, LU H L, FAN Y. Newton-Leibniz integration for ket-bra operators in quantum mechanics and derivation of entangled state representations[J]. Ann Phys, 2006, 321: 480-494.
|
[12] |
FAN H Y, LI C. Invariant ‘eigen-operator’ of the square of Schrdinger operator for deriving energy-level gap[J]. Phys Lett A, 2004, 321: 75-78.)
|