[1] |
FOX R. Quantum Optics:An Introduction[M]. Oxford: Oxford University Press. 2006:157-160.
|
[2] |
TAKEDA S, MIZUTA T, FUWA M, et al. Deterministic quantum teleportation of photonic quantum bits by a hybrid technique[J]. Nature, 2013,500:315-318.
|
[3] |
KRAUTER H, SALART D, MUSCHIK C A, et al. Deterministic quantum teleportation between distant atomic objects[J]. Nature Phys, 2013,9:400-404.
|
[4] |
RIEBE M, HAFFNER H, ROOS C F, et al. Deterministic quantum teleportation with atoms[J]. Nature, 2004,429:734-737.
|
[5] |
PFAFF W, HENSEN J B, BERNIEN H, et al. Unconditional quantum teleportation between distant solid-state quantum bits[J]. Science, 2014, 345(6196):532-535.
|
[6] |
STEFFEN L, SALATHE Y, OPPLIGER M, et al. Deterministic quantum teleportation with feed-forward in a solid state system[J]. Nature, 2013,500:319-322.
|
[7] |
WANG X L, CAI X D, SU Z E, et al. Quantum teleportation of multiple degrees of freedom of a single photon[J]. Nature, 2015,518:516-519.
|
[8] |
FAN H Y, KLAUDER J R. Eigenvectors of two particles’ relative position and total momentum[J].Phys Rev A, 1994, 49(2): 704-707.
|
[9] |
FAN H Y, YE X. Common eigenstates of two particles’ center-of-mass coordinates and mass-weighted relative momentum[J]. Phys Rev A, 1995, 51(4):3343-3346.
|
[10] |
WEYL H.Quantenmechanik and gruppentheorie[J]. Z Phys, 1927,46:1-46.
|
[11] |
FAN H Y. Newton-Leibniz integration for ket-bra operators in quantum mechanics(IV)[J]. Ann Phys, 2008, 323(2):500-526.
|
[12] |
FAN H Y.Weyl ordering quantum mechanical operators by virtue of the IWOP technique[J]. J Phys A Math Gen, 1992,25:3443-3447.
|
[13] |
WIGNER E. On the quantum correction for thermodynamic equilibrium[J].Phys Rev, 1932,40:749-759.
|
[14] |
XU Y J, FAN H Y, LIU Q Y. New equation for deriving pure state density operators by Weyl correspondence and Wigner operator[J]. Chin Phys B, 2010, 19(2):020303.
|
[15] |
XU X F. Obtaining multimode entangled state representation by generalized radon trans-formation of the Wigner operator[J]. Int J Theor Phys, 2010, 49(7):1446-1551.
|
[16] |
范洪义. 论由Dirac符号组成的算符之积分―从牛顿-莱布尼兹积分谈起[J]. 中国科学技术大学学报, 2007, 37(7):695-699.FAN Hongyi. On the integration over operators composed of Dirac’s symbols: Beyond Newton-Leibniz integration over c-number functions[J]. Journal of University of Science and Technology of China, 2007, 37(7):695-699.
|
[17] |
FAN H Y. Operator ordering in quantum optics theory and the development of Dirac’s symbolic method[J]. J Opt B: Quantum Semiclass Opt, 2003,5(4): R147.)
|
[1] |
FOX R. Quantum Optics:An Introduction[M]. Oxford: Oxford University Press. 2006:157-160.
|
[2] |
TAKEDA S, MIZUTA T, FUWA M, et al. Deterministic quantum teleportation of photonic quantum bits by a hybrid technique[J]. Nature, 2013,500:315-318.
|
[3] |
KRAUTER H, SALART D, MUSCHIK C A, et al. Deterministic quantum teleportation between distant atomic objects[J]. Nature Phys, 2013,9:400-404.
|
[4] |
RIEBE M, HAFFNER H, ROOS C F, et al. Deterministic quantum teleportation with atoms[J]. Nature, 2004,429:734-737.
|
[5] |
PFAFF W, HENSEN J B, BERNIEN H, et al. Unconditional quantum teleportation between distant solid-state quantum bits[J]. Science, 2014, 345(6196):532-535.
|
[6] |
STEFFEN L, SALATHE Y, OPPLIGER M, et al. Deterministic quantum teleportation with feed-forward in a solid state system[J]. Nature, 2013,500:319-322.
|
[7] |
WANG X L, CAI X D, SU Z E, et al. Quantum teleportation of multiple degrees of freedom of a single photon[J]. Nature, 2015,518:516-519.
|
[8] |
FAN H Y, KLAUDER J R. Eigenvectors of two particles’ relative position and total momentum[J].Phys Rev A, 1994, 49(2): 704-707.
|
[9] |
FAN H Y, YE X. Common eigenstates of two particles’ center-of-mass coordinates and mass-weighted relative momentum[J]. Phys Rev A, 1995, 51(4):3343-3346.
|
[10] |
WEYL H.Quantenmechanik and gruppentheorie[J]. Z Phys, 1927,46:1-46.
|
[11] |
FAN H Y. Newton-Leibniz integration for ket-bra operators in quantum mechanics(IV)[J]. Ann Phys, 2008, 323(2):500-526.
|
[12] |
FAN H Y.Weyl ordering quantum mechanical operators by virtue of the IWOP technique[J]. J Phys A Math Gen, 1992,25:3443-3447.
|
[13] |
WIGNER E. On the quantum correction for thermodynamic equilibrium[J].Phys Rev, 1932,40:749-759.
|
[14] |
XU Y J, FAN H Y, LIU Q Y. New equation for deriving pure state density operators by Weyl correspondence and Wigner operator[J]. Chin Phys B, 2010, 19(2):020303.
|
[15] |
XU X F. Obtaining multimode entangled state representation by generalized radon trans-formation of the Wigner operator[J]. Int J Theor Phys, 2010, 49(7):1446-1551.
|
[16] |
范洪义. 论由Dirac符号组成的算符之积分―从牛顿-莱布尼兹积分谈起[J]. 中国科学技术大学学报, 2007, 37(7):695-699.FAN Hongyi. On the integration over operators composed of Dirac’s symbols: Beyond Newton-Leibniz integration over c-number functions[J]. Journal of University of Science and Technology of China, 2007, 37(7):695-699.
|
[17] |
FAN H Y. Operator ordering in quantum optics theory and the development of Dirac’s symbolic method[J]. J Opt B: Quantum Semiclass Opt, 2003,5(4): R147.)
|