[1] |
Price M D, Somaroo S S, Tseng C H, et al. Construction and implementation of NMR quantum logic gates for two spin systems[J]. Journal of Magnetic Resonance, 1999, 140(2): 371-378.
|
[2] |
Takeda K, Kitagawa M. Attainment of high nuclear spin polarization in molecular solids and its applicability to NMR quantum computing[C]//ERATO conference on Quantum Information Science (EQIS 2003), Sep 4-6,2003, Niijima-Kaikan, Kyoto, Japan.
|
[3] |
Levitt M H, Raleigh D P, Creuzet F, et al. Theory and simulations of homonuclear spin pair systems in rotating solids[J]. The Journal of Chemical Physics, 1990, 92: 6 347-6 364.
|
[4] |
Ernst M, Samoson A, Meier B H. Decoupling and recoupling using continuous-wave irradiation in magic-angle-spinning solid-state NMR: A unified description using bimodal Floquet theory[J]. The Journal of Chemical Physics, 2005, 123: 064102.
|
[5] |
Bryce D L, Wasylishen R E. Encyclopedia of Spectroscopy and Spectrometry[M]. New York: Academic Press, 2010.
|
[6] |
Brinkmann A, Levitt M H. Symmetry principles in the NMR of spinning solids: Heteronuclear recoupling by generalized Hartmann-Hahn sequences[J]. The Journal of Chemical Physics, 2001, 115:357-384.
|
[7] |
Uto T, Takeda K, Kitagawa M. Controlled operation by solid-state NMR based on dipolar recoupling under magic angle spinning[EB/OL]. [2014-04-25]. http://qci.is.s.u-tokyo.ac.jp/qci/eqis03/program/posters/P613-Uto.pdf
|
[8] |
Bak M, Rasmussen J T, Nielsen N C. SIMPSON: A general simulation program for solid-state NMR spectroscopy[J]. Journal for Magnetic Resonance, 2000, 146: 296-330.
|
[9] |
Edén M. Computer simulations in solid-state NMR.Ⅰ. Spin dynamics theory[J]. Concepts in Magnetic Resonance Part A, 2003, 17A(1): 117-154.
|
[10] |
Varshalovich D A, Moskalev A N, Khersonskii V K. Quantum Theory of Angular Momentum[M]. Singapore: World Scientific, 1988.
|
[11] |
Herbehrlen U, Waugh J S. Coherent averaging effects in magnetic resonance[J]. Physical Review,1968, 175(2): 453-467.
|
[12] |
Madi Z L, Brüschweiler R, Ernst R R. One- and two-dimensional ensemble quantum computing in spin Liouville space[J]. J Chem Phys, 1998, 109: 10 603-10 611.
|
[1] |
Price M D, Somaroo S S, Tseng C H, et al. Construction and implementation of NMR quantum logic gates for two spin systems[J]. Journal of Magnetic Resonance, 1999, 140(2): 371-378.
|
[2] |
Takeda K, Kitagawa M. Attainment of high nuclear spin polarization in molecular solids and its applicability to NMR quantum computing[C]//ERATO conference on Quantum Information Science (EQIS 2003), Sep 4-6,2003, Niijima-Kaikan, Kyoto, Japan.
|
[3] |
Levitt M H, Raleigh D P, Creuzet F, et al. Theory and simulations of homonuclear spin pair systems in rotating solids[J]. The Journal of Chemical Physics, 1990, 92: 6 347-6 364.
|
[4] |
Ernst M, Samoson A, Meier B H. Decoupling and recoupling using continuous-wave irradiation in magic-angle-spinning solid-state NMR: A unified description using bimodal Floquet theory[J]. The Journal of Chemical Physics, 2005, 123: 064102.
|
[5] |
Bryce D L, Wasylishen R E. Encyclopedia of Spectroscopy and Spectrometry[M]. New York: Academic Press, 2010.
|
[6] |
Brinkmann A, Levitt M H. Symmetry principles in the NMR of spinning solids: Heteronuclear recoupling by generalized Hartmann-Hahn sequences[J]. The Journal of Chemical Physics, 2001, 115:357-384.
|
[7] |
Uto T, Takeda K, Kitagawa M. Controlled operation by solid-state NMR based on dipolar recoupling under magic angle spinning[EB/OL]. [2014-04-25]. http://qci.is.s.u-tokyo.ac.jp/qci/eqis03/program/posters/P613-Uto.pdf
|
[8] |
Bak M, Rasmussen J T, Nielsen N C. SIMPSON: A general simulation program for solid-state NMR spectroscopy[J]. Journal for Magnetic Resonance, 2000, 146: 296-330.
|
[9] |
Edén M. Computer simulations in solid-state NMR.Ⅰ. Spin dynamics theory[J]. Concepts in Magnetic Resonance Part A, 2003, 17A(1): 117-154.
|
[10] |
Varshalovich D A, Moskalev A N, Khersonskii V K. Quantum Theory of Angular Momentum[M]. Singapore: World Scientific, 1988.
|
[11] |
Herbehrlen U, Waugh J S. Coherent averaging effects in magnetic resonance[J]. Physical Review,1968, 175(2): 453-467.
|
[12] |
Madi Z L, Brüschweiler R, Ernst R R. One- and two-dimensional ensemble quantum computing in spin Liouville space[J]. J Chem Phys, 1998, 109: 10 603-10 611.
|