[2] Koashi M, Winter A. Monogamy of quantum entanglement and other correlations [J]. Physical Review A, 2004, 69: 022309.

[3] Breuer H P. Optimal entanglement criterion for mixed quantum states [J]. Physical Review Letters, 2006, 97: 080501.

[4] Julio I de Vicente. Lower bounds on concurrence and separability conditions [J]. Physical Review A, 2007, 75: 052320.

[5] Coffman V, Kundu J, Wootters W K. Distributed entanglement [J]. Physical Review A, 2000, 61: 052306.

[6] Osborne T J, Verstraete F. General monogamy inequality for bipartite qubit entanglement [J]. Physical Review Letters, 2006, 96: 220503.

[7] Hiroshima T, Adesso G, Illuminati F. Monogamy inequality for distributed Gaussian entanglement [J]. Physical Review Letters, 2007, 98: 050503.

[8] Dong Y, Horodecki K, Horodecki M, et al. Squashed entanglement for multipartite states and entanglement measures based on the mixed convex roof [J]. IEEE Transactions on Information Theory, 2009, 55: 3375.

[9] He H, Vidal G. Disentangling theorem and monogamy for entanglement negativity [J]. Physical Review A, 2015, 91: 012339.

[10] Bai Y K, Xu Y F, Wang Z D. General monogamy relation for the entanglement of formation in multiqubit systems [J]. Physical Review Letters, 2014, 113: 100503.

[11] Song W, Bai Y K, Yang M, et al. Generally monogamy of multi-qubit systems in terms of squared Rényi-α entanglement [J]. Physical Review A, 2016, 93: 022306.

[12] Yuan G M, Song W, Yang M, et al. Monogamy relation of multi-qubit systems for squared Tsallis-q entanglement [J]. Scientific Reports, 2016, 6: 28719.

[13] Zhu X N, Fei S M. Generalized monogamy relations of concurrence for N-qubit systems [J]. Physical Review A, 2015, 92: 062345.

[14] Luo Y, Li Y M. Monogamy of α-th power entanglement measurement in qubit system [J]. Annals of Physics, 2015, 362: 511.

[15] Luo Y, Tian T, Shao L H, et al. General monogamy of Tsallis-q entropy entanglement in multiqubit systems [J]. Physical Review A, 2016, 93: 062340.

[16] Jin Z X, Li J, Li T, et al. Tighter monogamy relations in multipartite systems [J]. Physical Review A, 2018, 97: 032336.

[18] Liang Y Y, Zheng Z J, Zhu C J. Tighter monogamy relations of quantum entanglement for multiqubit W-class states [J]. Quantum Information Processing, 2017, 16: 53.

[20] Kim J S. Tsallis entropy and entanglement constraints in multiqubit systems [J]. Physical Review A, 2010, 81: 062328.

[21] Yang L M, Chen B, Fei S M, et al. Polygamy inequalities for qubit systems [J]. International Journal of Theoretical Physics, 2019, 58: 2488-2496.

[22] Yang L M, Chen B, Fei S M, et al. Tighter constraints of multiqubit entanglement [J]. Communications in Theoretical Physics, 2019, 71: 545-554.