Effect of Interaction between Two Qubits on Qubits Entanglement Properties of Ultra-strongly Coupling Quantum Oscillator

Dong Kun

doi:10.3788/aos201636.0227003

[1] E Schr odinger. Die gegenwartige situation in der quantenmechanik[J]. Naturwissenschaften, 1935, 23(48): 807-812.

[2] A Einstein, B Podolsky, N Rosen. Can quantum-mechanical description of physical reality be considered complete [J]. Phys Rev, 1935, 47(10): 777-780.

[3] S J van Enk, J I Cirac, P Zoller. Ideal quantum communication over noisy channels: a quantum optical implementation[J]. Phys Rev Lett, 1997, 78(22): 4293-4296.

[4] A K Ekert. Quantum cryptography based on Bell’s theorem[J]. Phys Rev Lett, 1991, 67(6): 661-663.

[5] M A Nielsen, I L Chuang. Quantum Computation and Quantum Information[M]. Cambridge: Cambridge University Press, 2000.

[6] E T Jaynes, F W Cummings. Comparison of quantum and semiclassical radiation theories with application to the beam maser[J]. Proc IEEE, 1963, 51(1): 89-109.

[7] W Son, M S Kim J Lee, et al.. Entanglement transfer from continuous variables to qubits[J]. J Mod Opt, 2002, 49(1): 1739-1746.

[8] T Yu, J H Eberly. Sudden death of Entanglement[J]. Science, 2009, 323(5914): 598-601.

[9] B Kraus, J I Cirac. Discrete entanglement distribution with squeezed light[J]. Phys Rev Lett, 2004, 92(1): 013602.

[10] M Paternostro, W Son, M S Kim. Complete conditions for entanglement transfer[J]. Phys Rev Lett, 2004, 92(19): 197901.

[11] M Paternostro, W Son, M S Kim, et al.. Dynamical entanglement transfer for quantum-information networks[J]. Phys Rev A, 2004, 70(2): 022320.

[12] J Lee, M Paternostro, M S Kim, et al.. Entanglement reciprocation between qubits and continuous variables[J]. Phys Rev Lett, 2006, 96 (8): 080501.

[13] L Zhou, G H Yang. Entanglement reciprocation between atomic qubits and an entangled coherent state[J]. J Phys B, 2006, 39(24): 5143- 5150.

[14] R W Rendell, A K Rajagopal. Revivals and entanglement from initially entangled mixed states of a damped Jaynes-Cummings model [J]. Phys Rev A, 2003, 67(6): 062110.

[15] I I Rabi. On the process of space quantization[J]. Phys Rev, 1936, 49(4): 324-328.

[16] I I Rabi. Space quantization in a gyrating magnetic field[J]. Phys Rev, 1937, 51(8): 652-654.

[17] T Niemczyk, F Deppe, H Huebl, et al.. Circuit quantum electrodynamics in the ultrastrong-coupling regime[J]. Nature Physics, 2010, 6(10): 772-776.

[18] P Forn-Díaz, J Lisenfeld, D Marcos, et al.. Observation of the bloch-siegert shift in a qubit-oscillator system in the ultrastrong coupling regime[J]. Phys Rev Lett, 2010, 105(23): 237001.

[19] A Fedorov, A K Feofanov, P Macha, et al.. Strong coupling of a quantum oscillator to a flux qubit at its symmetry poin[J]. Phys Rev Lett, 2010, 105(6): 060503.

[20] E K Irish, J Gea-Banacloche, I Martin, et al.. Dynamics of a two-level system strongly coupled to a high-frequency quantum oscillator [J]. Phys Rev B, 2005, 72(19): 195410.

[21] E K Irish. Generalized rotating-wave approximation for arbitrarily large coupling[J]. Phys Rev Lett, 2007, 99(17): 173601.

[22] M H Devoret, S Girvin, R Schoelkopf. Circuit-QED: How strong can the coupling between a Josephson junction atom and a transmission line resonator be[J]. Ann Phys(Leipzig), 2007, 16(10-11): 767-779.

[23] J Bourassa, J M Gambetta, A A Abdumalikov, et al.. Ultrastrong coupling regime of cavity QED with phase-biased flux qubits[J]. Phys Rev A, 2009, 80(3): 032109.

[24] S Ashhab, F Nori. Qubit-oscillator systems in the ultrastrong-coupling regime and their potential for preparing nonclassical state[J]. Phys Rev A, 2010, 81(4): 042311.

[25] J Hausinger, M Grifoni. Qubit-oscillator system: An analytical treatment of the ultrastrong coupling regime[J]. Phys Rev A, 2010, 82(6): 062320.

[26] J Casanova, G Romero, I Lizuain, et al.. Deep strong coupling regime of the jaynes-cummings model[J]. Phys Rev Lett, 2010, 105(26): 263603.

[27] D Braak. Integrability of the Rabi model[J]. Phys Rev Lett, 2011, 107(10): 100401.

[28] T Liu, K L Wang, M Feng. The generalized analytical approximation to the solution of the single-mode spin-boson model without rotatingwave approximation[J]. Europhys Lett, 2009, 86(5): 054003.

[29] T Liu, M Feng, K L Wang. Vacuum-induced Berry phase beyond the rotating-wave approximation[J]. Phys Rev A, 2011, 84(6): 062109.

[30] T Liu, M Feng, W L Yang, et al.. Parity breaking and scaling behavior in light-matter interaction[J]. Phys Rev A, 2013, 88(1): 013820.

[31] Q H Chen, C Wang, S He, et al.. Exact solvability of the quantum Rabi model using bogoliubov operators[J]. Phys Rev A, 2012, 86(2): 023822.

[32] T Sandu. Dynamics of a quantum oscillator strongly and off-resonantly coupled with a two-level system[J]. Phys lett A, 2009, 37(31): 2753-2759.

[33] S Ashhab, F Nori. Qubit-oscillator systems in the ultrastrong-coupling regime and their potential for preparing nonclassical states[J]. Phys Rev A, 2010, 81(4): 042311.

[34] J Casanova, G Romero, I Lizuain, et al.. Deep strong coupling regime of the jaynes-cummings model[J]. Phys Rev Lett, 2010, 105(26): 263603.

[35] M J Hwang, M S Choi. Variational study of a two-level system coupled to a harmonic oscillator in an ultrastrong-coupling regime[J]. Phys Rev A, 2010, 82(2): 025802.

[36] I D Feranchuk, L I Komarov, A P Ulyanenkov. Two-level system in a one-mode quantum field: numerical solution on the basis of the operator method[J]. J Phys A Math Gen, 1996, 29(14): 4035-4047.

[37] M Amniat-Talab, S Guerin, H R Jauslin. Quantum averaging and resonances: two-level atom in a one-mode quantized field[J]. J Math Phys, 2005, 46(4): 042311.

[38] E K Irish. Generalized rotating-wave approximation for arbitrarily large coupling[J]. Phys Rev Lett, 2007, 99(17): 173601.

[39] F A Wolf, F Vallone, G Romero, et al.. Dynamical correlation functions and the quantum Rabi model[J]. Phys Rev A, 2014, 87(2): 023835.

[40] S Agarwal, S M H Rafsanjani, J H Eberly. Tavis-Cummings model beyond therotating wave approximation: quasi-degenerate qubits[J]. Phys Rev A, 2012, 85(4): 043815.

[41] Q H Chen, T Liu, Y Y Zhang, et al.. Quantum phase transitions in coupled two-level atoms in a single-mode cavity[J]. Phys Rev A, 2010, 82(5): 053841.

[42] J M Martinis. Superconducting phase qubits[J]. Quantum Inf Process, 2009, 8(2-3): 81-103.

[43] R McDermott, R W Simmonds, M Steffen, et al.. Simultaneous state measurement of coupled josephson phase qubits[J]. Science, 2005, 307(5713): 1299-1302.

[44] S Matsuo, S Ashhab, F Fujii, et al.. Generation of macroscopic entangled states in coupled superconducting phase qubits[J]. J Phys Soc Jpn, 2007, 76(5): 054802.

[45] W A Al Saidi, D Stroud. Several small Josephson junctions in a resonant cavity: deviation from the Dicke model[J]. Phys Rev B, 2002, 65(22): 224512.

[46] A Ballesteros, O Civitarese, F J Herranz, et al.. Collective and boson mapping description of a system of N josephson junctions in a resonant cavity[J]. Phys Rev A, 2003, 68(21): 214519.

[47] K Kobayashi, D Stroud. Coherence transition of small josephson junctions coupled to a single-mode resonant cavity: connection to the Dicke model[J]. J Physc, 2009, 469(5-6): 216-224.

[48] C Z Wang, C X Li, L Y Nie, et al.. Classical correlation and quantum discord mediated by cavity in two coupled qubits[J]. J Phys B, 2011, 44(1): 015503.

[49] G Chen, D F Zhao, Z D Chen. Quantum phase transition for the Dicke model with the dipole–dipole interactions[J]. J Phys B, 2006, 39 (14): 3315-3320.

[50] S V Lawande, B N Jagatap, R R Puri. Laser phase and amplitude fluctuations in the fluorescent Dicke model of interacting atoms[J]. J Phys B, 1985, 18(9): 1711-1733.

[51] J S Peng, G X Li. Introduction to Modern Quantum Optics[M]. Singapore: World Scientific, 1998.

[52] Q H Chen, T Liu, Y Y Zhang, et al.. Entanglement dynamics of two independent jaynes-cummings atoms without the rotating-wave approximation[J]. Phys Rev A, 2010, 82(5): 052306.

[53] W K Wootters. Entanglement of formation of an arbitrary state of two qubits[J]. Phys Rev Lett, 1998, 80(10): 2245-2248.

[54] Li Fang, Zhou Yaoyao, Meng Xiaojun. Entanglement enhancement of bipartite entangled states through coherent feedback control[J]. Acta Optica Sinica, 2014, 34(10): 1027001.

[55] Guo Zhanying, Zhang Xinhai, Xiao Ruihua, et al.. Dynamics of quantum entanglement in a two-qubit XXZ heisenberg system[J]. Acta Optica Sinica, 2014, 34(7): 0727001.

[56] Zhai Shuqin, Yang Rui. Three-color and tripartite entangled state from cascaded type I second-harmonic generations[J]. Acta Optica Sinica, 2014, 34(4): 0427002.

[57] C Z Wang, C X Liu, L Y Nie, et al.. Classical correlation and quantum discord mediated by cavity in two coupled qubits[J]. J Phys B, 2011, 44(1): 015503.

[58] Y Q Zhang, T Liu, P Barker. Effects of dipole-dipole interaction on the transmitted spectrum of two-level atoms trapped in an optical cavity[J]. Phys Rev A, 2014, 89(4): 043838.