×
近期发现有不法分子冒充我刊与作者联系,借此进行欺诈等不法行为,请广大作者加以鉴别,如遇诈骗行为,请第一时间与我刊编辑部联系确认(《中国物理C》(英文)编辑部电话:010-88235947,010-88236950),并作报警处理。
本刊再次郑重声明:
(1)本刊官方网址为cpc.ihep.ac.cn和https://iopscience.iop.org/journal/1674-1137
(2)本刊采编系统作者中心是投稿的唯一路径,该系统为ScholarOne远程稿件采编系统,仅在本刊投稿网网址(https://mc03.manuscriptcentral.com/cpc)设有登录入口。本刊不接受其他方式的投稿,如打印稿投稿、E-mail信箱投稿等,若以此种方式接收投稿均为假冒。
(3)所有投稿均需经过严格的同行评议、编辑加工后方可发表,本刊不存在所谓的“编辑部内部征稿”。如果有人以“编辑部内部人员”名义帮助作者发稿,并收取发表费用,均为假冒。
                  
《中国物理C》(英文)编辑部
2024年10月30日

Muon anomalous magnetic dipole moment in the μνSSM

  • Recently, the Muon g-2 experiment at Fermilab measured the muon anomalous magnetic dipole moment (MDM), $ a_\mu=(g_\mu-2)/2 $, and reported that the new experimental average increases the difference between the experiment and the standard model (SM) prediction to 4.2σ. In this work, we reanalyze the muon anomalous MDM at the two-loop level in the μ from the ν Supersymmetric Standard Model ( $ \mu\nu $SSM) combined with the updated experimental average. The $ \mu\nu $SSM can explain the current difference between the experimental measurement and the SM theoretical prediction for the muon anomalous MDM, constrained by the 125 GeV Higgs boson mass and decays, the rare decay $ \bar{B}\rightarrow X_s\gamma $, and so on. We also investigate the anomalous MDM of the electron and tau lepton, $ a_e=(g_e-2)/2 $ and $ a_\tau=(g_\tau-2)/2 $, at the two-loop level in the $ \mu\nu $SSM. In addition, the decaying of the 125 GeV Higgs boson into a pair of charged leptons in the $ \mu\nu $SSM is analyzed.
  • 加载中
  • [1] B. Abi et al. (Muon g-2 Collaboration), Phys. Rev. Lett. 126, 141801 (2021) doi: 10.1103/PhysRevLett.126.141801
    [2] T. Albahri et al. (Muon g-2 Collaboration), Phys. Rev. D 103, 072002 (2021) doi: 10.1103/PhysRevD.103.072002
    [3] T. Albahri et al. (Muon g-2 Collaboration), Phys. Rev. A 103, 042208 (2021) doi: 10.1103/PhysRevA.103.042208
    [4] T. Albahri et al. (Muon g-2 Collaboration), Phys. Rev. Accel. Beams 24, 044002 (2021) doi: 10.1103/PhysRevAccelBeams.24.044002
    [5] G.W. Bennett et al. (Muon g-2 Collaboration), Phys. Rev. D 73, 072003 (2006) doi: 10.1103/PhysRevD.73.072003
    [6] T. Aoyama et al., Phys. Rept. 887, 1-166 (2020), arXiv:2006.04822[hep-ph doi: 10.1016/j.physrep.2020.07.006
    [7] F. Jegerlehner and A. Nyffeler, Phys. Rept. 477, 1-110 (2009), arXiv:0902.3360[hep-ph doi: 10.1016/j.physrep.2009.04.003
    [8] M. Davier, A. Hoecker, B. Malaescu et al., Eur. Phys. J. C 71, 1515 (2011), arXiv:1010.4180[hep-ph doi: 10.1140/epjc/s10052-010-1515-z
    [9] S. Eidelman and F. Jegerlehner, Z. Phys. C 67, 585-602 (1995), arXiv:hep-ph/9502298[hep-ph doi: 10.1007/BF01553984
    [10] T. Moroi, Phys. Rev. D 53, 6565-6575 (1996)[erratum: Phys. Rev. D 56, 4424 (1997)], arXiv:hep-ph/9512396[hep-ph]
    [11] T. Aoyama, M. Hayakawa, T. Kinoshita et al., Phys. Rev. Lett. 109, 111808 (2012), arXiv:1205.5370[hep-ph doi: 10.1103/PhysRevLett.109.111808
    [12] K. Hagiwara, A. D. Martin, D. Nomura et al., Phys. Lett. B 649, 173-179 (2007), arXiv:hep-ph/0611102[hep-ph doi: 10.1016/j.physletb.2007.04.012
    [13] J. Bijnens, E. Pallante, and J. Prades, Nucl. Phys. B 474, 379-420 (1996), arXiv:hep-ph/9511388[hep-ph doi: 10.1016/0550-3213(96)00288-X
    [14] S. P. Martin and J. D. Wells, Phys. Rev. D 64, 035003 (2001), arXiv:hep-ph/0103067[hep-ph doi: 10.1103/PhysRevD.64.035003
    [15] M. Lindner, M. Platscher, and F. S. Queiroz, Phys. Rept. 731, 1-82 (2018), arXiv:1610.06587[hep-ph doi: 10.1016/j.physrep.2017.12.001
    [16] K. Hagiwara, A. D. Martin, D. Nomura et al., Phys. Rev. D 69, 093003 (2004), arXiv:hep-ph/0312250[hep-ph doi: 10.1103/PhysRevD.69.093003
    [17] J. Bijnens, E. Pallante, and J. Prades, Nucl. Phys. 626, 410-411 (2002), arXiv:hep-ph/0112255[hep-ph doi: 10.1016/S0550-3213(02)00074-3
    [18] U. Chattopadhyay and P. Nath, Phys. Rev. D 53, 1648-1657 (1996), arXiv:hep-ph/9507386[hep-ph doi: 10.1103/PhysRevD.53.1648
    [19] M. Davier, A. Hoecker, B. Malaescu et al., Eur. Phys. J. C 77, 827 (2017), arXiv:1706.09436[hep-ph doi: 10.1140/epjc/s10052-017-5161-6
    [20] J. Bijnens, E. Pallante, and J. Prades, Phys. Rev. Lett. 75 (1995), 1447-1450[erratum: Phys. Rev. Lett. 75 (1995), 3781], arXiv:hep-ph/9505251[hep-ph]
    [21] K. Hagiwara, A. D. Martin, D. Nomura et al., Phys. Lett. B 557, 69-75 (2003), arXiv:hep-ph/0209187[hep-ph doi: 10.1016/S0370-2693(03)00138-2
    [22] M. Hayakawa, T. Kinoshita, and A. I. Sanda, Phys. Rev. Lett. 75, 790-793 (1995), arXiv:hep-ph/9503463[hep-ph doi: 10.1103/PhysRevLett.75.790
    [23] L. L. Everett, G. L. Kane, S. Rigolin et al., Phys. Rev. Lett. 86, 3484-3487 (2001), arXiv:hep-ph/0102145[hep-ph doi: 10.1103/PhysRevLett.86.3484
    [24] E. de Rafael, Phys. Lett. B 322, 239-246 (1994), arXiv:hep-ph/9311316[hep-ph doi: 10.1016/0370-2693(94)91114-2
    [25] U. Chattopadhyay and P. Nath, Phys. Rev. Lett. 86, 5854-5857 (2001), arXiv:hep-ph/0102157[hep-ph doi: 10.1103/PhysRevLett.86.5854
    [26] M. Hayakawa, T. Kinoshita, and A. I. Sanda, Phys. Rev. D 54, 3137-3153 (1996), arXiv:hep-ph/9601310[hep-ph doi: 10.1103/PhysRevD.54.3137
    [27] J. Hisano and K. Tobe, Phys. Lett. B 510, 197-204 (2001), arXiv:hep-ph/0102315[hep-ph doi: 10.1016/S0370-2693(01)00494-4
    [28] J. F. de Troconiz and F. J. Yndurain, Phys. Rev. D 65, 093001 (2002), arXiv:hep-ph/0106025[hep-ph doi: 10.1103/PhysRevD.65.093001
    [29] S. Baek, N. G. Deshpande, X. G. He et al., Phys. Rev. D 64, 055006 (2001), arXiv:hep-ph/0104141[hep-ph doi: 10.1103/PhysRevD.64.055006
    [30] H. Davoudiasl, H. S. Lee, and W. J. Marciano, Phys. Rev. D 86, 095009 (2012), arXiv:1208.2973[hep-ph doi: 10.1103/PhysRevD.86.095009
    [31] M. J. Ramsey-Musolf and M. B. Wise, Phys. Rev. Lett. 89, 041601 (2002), arXiv:hep-ph/0201297[hep-ph doi: 10.1103/PhysRevLett.89.041601
    [32] M. Benayoun, P. David, L. DelBuono et al., Eur. Phys. J. C 73, 2453 (2013), arXiv:1210.7184[hep-ph doi: 10.1140/epjc/s10052-013-2453-3
    [33] G. Colangelo, M. Hoferichter, A. Nyffeler et al., Phys. Lett. B 735, 90-91 (2014), arXiv:1403.7512[hep-ph doi: 10.1016/j.physletb.2014.06.012
    [34] S. Komine, T. Moroi, and M. Yamaguchi, Phys. Lett. B 506, 93-98 (2001), arXiv:hep-ph/0102204[hep-ph doi: 10.1016/S0370-2693(01)00381-1
    [35] T. Kinoshita and M. Nio, Phys. Rev. D 73, 053007 (2006), arXiv:hep-ph/0512330[hep-ph doi: 10.1103/PhysRevD.73.053007
    [36] F. Wang, L. Wu, J. M. Yang et al., Phys. Lett. B 759, 191-199 (2016), arXiv:1512.06715[hep-ph doi: 10.1016/j.physletb.2016.05.071
    [37] B. Allanach, F. S. Queiroz, A. Strumia et al., Phys. Rev. D 93, 055045 (2016), arXiv:1511.07447[hep-ph doi: 10.1103/PhysRevD.93.055045
    [38] G. Belanger, F. Boudjema, A. Cottrant et al., Phys. Lett. B 519, 93-102 (2001), arXiv:hep-ph/0106275[hep-ph doi: 10.1016/S0370-2693(01)00976-5
    [39] D. Chang, W. F. Chang, C. H. Chou et al., Phys. Rev. D 63, 091301(R) (2001), arXiv:hep-ph/0009292[hep-ph doi: 10.1103/PhysRevD.63.091301
    [40] T. Aoyama, M. Hayakawa, T. Kinoshita et al., Phys. Rev. Lett. 99, 110406 (2007), arXiv:0706.3496[hep-ph doi: 10.1103/PhysRevLett.99.110406
    [41] M. Passera, Phys. Rev. D 75, 013002 (2007), arXiv:hep-ph/0606174[hep-ph doi: 10.1103/PhysRevD.75.013002
    [42] J. Cao, J. Lian, L. Meng et al., Phys. Rev. D 101, 095009 (2020), arXiv:1912.10225[hep-ph doi: 10.1103/PhysRevD.101.095009
    [43] M. Abdughani, K. I. Hikasa, L. Wu et al., JHEP 11, 095 (2019), arXiv:1909.07792[hep-ph
    [44] F. Wang, K. Wang, J. M. Yang et al., JHEP 12, 041 (2018), arXiv:1808.10851[hep-ph
    [45] F. Wang, W. Wang, and J. M. Yang, Phys. Rev. D 96, 075025 (2017), arXiv:1703.10894[hep-ph doi: 10.1103/PhysRevD.96.075025
    [46] E. Kiritsis and P. Anastasopoulos, JHEP 05, 054 (2002), arXiv:hep-ph/0201295[hep-ph
    [47] B. P. Padley, K. Sinha, and K. Wang, Phys. Rev. D 92, 055025 (2015), arXiv:1505.05877[hep-ph doi: 10.1103/PhysRevD.92.055025
    [48] S. P. Li, X. Q. Li, and Y. D. Yang, Phys. Rev. D 99, 035010 (2019), arXiv:1808.02424[hep-ph doi: 10.1103/PhysRevD.99.035010
    [49] S. P. Li, X. Q. Li, Y. Y. Li et al., JHEP 01, 034 (2021), arXiv:2010.02799[hep-ph
    [50] J. Cao, Y. He, J. Lian et al., arXiv: 2102.11355[hep-ph]
    [51] N. Chen, B. Wang, and C. Y. Yao, arXiv: 2102.05619[hep-ph]
    [52] W. Yin, arXiv: 2103.14234[hep-ph]
    [53] W. Yin and M. Yamaguchi, arXiv: 2012.03928[hep-ph]
    [54] D. Sabatta, A. S. Cornell, A. Goyal et al., Chin. Phys. C 44, 063103 (2020), arXiv:1909.03969[hep-ph doi: 10.1088/1674-1137/44/6/063103
    [55] S. Buddenbrock, A. S. Cornell, Y. Fang et al., JHEP 10, 157 (2019), arXiv:1901.05300[hep-ph
    [56] S. von Buddenbrock, N. Chakrabarty, A. S. Cornell et al., Eur. Phys. J. C 76, 580 (2016), arXiv:1606.01674[hep-ph doi: 10.1140/epjc/s10052-016-4435-8
    [57] N. Okada and H. M. Tran, Phys. Rev. D 94, 075016 (2016), arXiv:1606.05329[hep-ph doi: 10.1103/PhysRevD.94.075016
    [58] T. Fukuyama, N. Okada, and H. M. Tran, Phys. Lett. B 767, 295-302 (2017), arXiv:1611.08341[hep-ph doi: 10.1016/j.physletb.2017.02.021
    [59] G. Bélanger, J. Da Silva, and H. M. Tran, Phys. Rev. D 95, 115017 (2017), arXiv:1703.03275[hep-ph doi: 10.1103/PhysRevD.95.115017
    [60] H. M. Tran and H. T. Nguyen, Phys. Rev. D 99, 035040 (2019), arXiv:1812.11757[hep-ph doi: 10.1103/PhysRevD.99.035040
    [61] E. Chao, Renwick J. Hudspith, Antoine Gerardin et al., arXiv: 2104.02632
    [62] A. E. Carcamo Hernandez, Catalina Espinoza, Juan Carlos Gomez-Izquierdo et al., arXiv: 2104.02730
    [63] Andreas Crivellin and Martin Hoferichter, arXiv: 2104.03202
    [64] Motoi Endo, Koichi Hamaguchi, Sho Iwamoto et al., arXiv: 2104.03217
    [65] Sho Iwamoto, Tsutomu T. Yanagida, and Norimi Yokozaki, arXiv: 2104.03223
    [66] Xiao-Fang Han, Tianjun Li, Hong-Xin Wang et al., arXiv: 2104.03227
    [67] Giorgio Arcadi, Lorenzo Calibbi, Marco Fedele et al., arXiv: 2104.03228
    [68] Juan C. Criado, Abdelhak Djouadi, Niko Koivunen et al., arXiv: 2104.03231
    [69] Bin Zhu and Xuewen Liu, arXiv: 2104.03238
    [70] Yuchao Gu, Ning Liu, Liangliang Su et al., arXiv: 2104.03239
    [71] Hong-Xin Wang, Lei Wang, and Yang Zhang, arXiv: 2104.03242
    [72] Melissa van Beekveld, Wim Beenakker, Marrit Schutten et al., arXiv: 2104.03245
    [73] Wen Yin, arXiv: 2104.03259
    [74] Fei Wang, Lei Wu, Yang Xiao et al., arXiv: 2104.03262
    [75] Manuel A. Buen-Abad, JiJi Fan, Matthew Reece et al., arXiv: 2104.03267
    [76] Pritam Das, Mrinal Kumar Das, and Najimuddin Khan, arXiv: 2104.03271
    [77] Murat Abdughani, Yi-Zhong Fan, Lei Feng et al., arXiv: 2104.03274
    [78] Chuan-Hung Chen, Cheng-Wei Chiang, and Takaaki Nomura, arXiv: 2104.03275
    [79] Shao-Feng Ge, Xiao-Dong Ma, and Pedro Pasquini, arXiv: 2104.03276
    [80] M. Cadeddu, N. Cargioli, F. Dordei et al., arXiv: 2104.03280
    [81] Vedran Brdar, Sudip Jana, Jisuke Kubo et al., arXiv: 2104.03282
    [82] Junjie Cao, Jingwei Lian, Yusi Pan et al., arXiv: 2104.03284
    [83] Manimala Chakraborti, Sven Heinemeyer, and Ipsita Saha, arXiv: 2104.03287
    [84] Masahiro Ibe, Shin Kobayashi, Yuhei Nakayama et al., arXiv: 2104.03289
    [85] Peter Cox, Chengcheng Han, and Tsutomu T. Yanagida, arXiv: 2104.03290
    [86] K. S. Babu, Sudip Jana, Manfred Lindner et al., arXiv: 2104.03291
    [87] Chengcheng Han, arXiv: 2104.03292
    [88] Sven Heinemeyer, Essodjolo Kpatcha, Inaki Lara et al., arXiv: 2104.03294.
    [89] Lorenzo Calibbi, M. L. Lopez-Ibanez, Aurora Melis et al, arXiv: 2104.03296
    [90] D. W. P. Amaral, D. G. Cerdeno, A. Cheek et al., arXiv: 2104.03297
    [91] Yang Bai and Joshua Berger, arXiv: 2104.03301
    [92] Sebastian Baum, Marcela Carena, Nausheen R. Shah et al., arXiv: 2104.03302
    [93] S. Borsanyi, Z. Fodor, J. N. Guenther et al., Nature 593(7857), 51-55 (2021) doi: 10.1038/s41586-021-03418-1
    [94] D. E. López-Fogliani and C. Muñoz, Phys. Rev. Lett. 97, 041801 (2006) doi: 10.1103/PhysRevLett.97.041801
    [95] N. Escudero, D. E. López-Fogliani, C. Muñoz et al., JHEP 12, 099 (2008), arXiv:0810.1507
    [96] J. Fidalgo, D.E. López-Fogliani, C. Muñoz et al., JHEP 10, 020 (2011), arXiv:1107.4614
    [97] P. Bandyopadhyay, P. Ghosh, and S. Roy, Phys. Rev. D 84, 115022 (2011), arXiv:1012.5762 doi: 10.1103/PhysRevD.84.115022
    [98] P. Ghosh, D. E. López-Fogliani, V. A. Mitsou et al., Phys. Rev. D 88, 015009 (2013), arXiv:1211.3177 doi: 10.1103/PhysRevD.88.015009
    [99] H.-B. Zhang, T.-F. Feng, G.-F. Luo et al., JHEP 07 (2013) 069[Erratum ibid. 10 (2013) 173], arXiv:1305.4352
    [100] H.-B. Zhang, T.-F. Feng, S.-M. Zhao et al., Int. J. Mod. Phys. A 29, 1450123 (2014), arXiv:1407.7365 doi: 10.1142/S0217751X14501231
    [101] J.E. Kim and H.P. Nilles, Phys. Lett. B 138, 150 (1984) doi: 10.1016/0370-2693(84)91890-2
    [102] H. P. Nilles, Phys. Rep. 110, 1 (1984) doi: 10.1016/0370-1573(84)90008-5
    [103] H. E. Haber and G. L. Kane, Phys. Rept. 117, 75 (1985) doi: 10.1016/0370-1573(85)90051-1
    [104] H. E. Haber, arXiv: hep-ph/9306207
    [105] S. P. Martin, arXiv: hep-ph/9709356
    [106] J. Rosiek, Phys. Rev. D 41, 3464 (1990), arXiv:hep-ph/9511250 doi: 10.1103/PhysRevD.41.3464
    [107] P. Ghosh and S. Roy, JHEP 04, 069 (2009), arXiv:0812.0084
    [108] A. Bartl, M. Hirsch, S. Liebler et al., JHEP 05, 120 (2009), arXiv:0903.3596
    [109] J. Fidalgo, D. E. López-Fogliani, C. Muñoz et al., JHEP 08, 105 (2009), arXiv:0904.3112
    [110] P. Ghosh, P. Dey, B. Mukhopadhyaya et al., JHEP 05, 087 (2010), arXiv:1002.2705
    [111] D. E. López-Fogliani, arXiv: 1004.0884
    [112] H.-B. Zhang, T.-F. Feng, Z.-F. Ge et al., JHEP 02, 012 (2014), arXiv:1401.2704
    [113] H.-B. Zhang, T.-F. Feng, L.-N. Kou et al., Int. J. Mod. Phys. A 28, 1350117 (2013), arXiv:1307.6284 doi: 10.1142/S0217751X13501170
    [114] K.-Y. Choi, D. E. López-Fogliani, C. Muñoz et al., JCAP 1003, 028 (2010)
    [115] G. A. Gómez-Vargas, M. Fornasa, F. Zandanel et al., JCAP 1202, 001 (2012)
    [116] A. Albert et al., JCAP 1410, 023 (2014)
    [117] G. A. Gómez-Vargas, D. E. López-Fogliani, C. Muñoz et al., JCAP 1703, 047 (2017)
    [118] G. A. Gómez-Vargas, D. E. López-Fogliani, C. Muñoz et al., JCAP 01, 058 (2020), arXiv:1911.03191
    [119] G. A. Gómez-Vargas, D. E. López-Fogliani, C. Muñoz et al., Astropart. Phys. 125, 102506 (2021), arXiv:1911.08550 doi: 10.1016/j.astropartphys.2020.102506
    [120] H.-B. Zhang, T.-F. Feng, X.-Y. Yang et al., Phys. Rev. D 95, 075013 (2017), arXiv:1704.03388 doi: 10.1103/PhysRevD.95.075013
    [121] H.-B. Zhang, T.-F. Feng, F. Sun et al., Phys. Rev. D 89, 115007 (2014), arXiv:1307.3607 doi: 10.1103/PhysRevD.89.115007
    [122] H.-B. Zhang, T.-F. Feng, S.-M. Zhao et al., Chin. Phys. C 4, 043106 (2017), arXiv:1511.08979
    [123] C.-X. Liu, H.-B. Zhang, J.-L. Yang et al., JHEP 04, 002 (2020), arXiv:2002.04370
    [124] C.-X. Liu, H.-B. Zhang et al., arXiv: 2012.14786
    [125] D. Hanneke, S. Fogwell, and G. Gabrielse, Phys. Rev. Lett. 100, 120801 (2008) doi: 10.1103/PhysRevLett.100.120801
    [126] R. H. Parker, C. Yu, W. Zhong et al., Science 360, 191 (2018) doi: 10.1126/science.aap7706
    [127] L. Morel, Z. Yao, P. Clade et al., Nature 588, 61 (2020) doi: 10.1038/s41586-020-2964-7
    [128] P.A. Zyla et al. (Particle Data Group), Prog. Theor. Exp. Phys. 2020 (2020) 083C01, and 2021 update
    [129] G. Aad et al. (ATLAS Collaboration), Phys. Lett. B 812, 135980 (2021), arXiv:2007.07830 doi: 10.1016/j.physletb.2020.135980
    [130] A. M. Sirunyan et al. (CMS Collaboration), JHEP 01, 148 (2021), arXiv:2009.04363
    [131] L. Resnick, M. K. Sundaresan, and P. J. S. Watson, Phys. Rev. D 8, 172 (1973) doi: 10.1103/PhysRevD.8.172
    [132] J. Ellis, M. K. Gaillard, and D. V. Nanopoulos, Nucl. Phys. B 106, 292 (1976) doi: 10.1016/0550-3213(76)90184-X
    [133] D. Y. Bardin, B. M. Vilensk,y and P. K. Khristova, Sov. J. Nucl. Phys. 53 (1991) 152, [Yad. Fiz. 53 (1991) 240]
    [134] A. Dabelstein and W. Hollik, Z. Phys. C 53, 507 (1992) doi: 10.1007/BF01625912
    [135] B. A. Kniehl, Nucl. Phys. B 376, 3 (1992) doi: 10.1016/0550-3213(92)90065-J
    [136] B. A. Kniehl, Phys. Rept. 240, 211 (1994) doi: 10.1016/0370-1573(94)90037-X
    [137] A. Djouadi, Phys. Rept. 457, 1 (2008) doi: 10.1016/j.physrep.2007.10.004
    [138] A. Djouadi, Phys. Rept. 459, 1 (2008) doi: 10.1016/j.physrep.2007.10.005
    [139] G. F. Giudice and O. Lebedev, Phys. Lett. B 665, 79 (2008), arXiv:0804.1753 doi: 10.1016/j.physletb.2008.05.062
    [140] N. Vignaroli, Phys. Rev. D 80, 095023 (2009), arXiv:0906.4078 doi: 10.1103/PhysRevD.80.095023
    [141] A. Dery, A. Efrati, Y. Hochberg et al., JHEP 05, 039 (2013), arXiv:1302.3229
    [142] D. de Florian et al. (LHC Higgs Cross Section Working Group), CYRM-2017-002, arXiv: 1610.07922
    [143] A. Crivellin, D. Mueller, and F. Saturnino, arXiv: 2008.02643
    [144] T. F. Feng and X. Y. Yang, Nucl. Phys. B 814, 101 (2009) doi: 10.1016/j.nuclphysb.2009.01.012
    [145] T. F. Feng, L. Sun, and X. Y. Yang, Nucl. Phys. B 800, 221 (2008) doi: 10.1016/j.nuclphysb.2008.03.019
    [146] T. F. Feng, L. Sun, and X. Y. Yang, Phys. Rev. D 77, 116008 (2008) doi: 10.1103/PhysRevD.77.116008
    [147] H. Arason, D. J. Castano, B. Keszthelyi et al., Phys. Rev. D 46, 3945 (1992)
    [148] S. Chen et al. (CLEO Collaboration), Phys. Rev. Lett. 87, 251807 (2001) doi: 10.1103/PhysRevLett.87.251807
    [149] A. Limosani et al. (BELLE Collaboration), Phys. Rev. Lett. 103, 241801 (2009) doi: 10.1103/PhysRevLett.103.241801
    [150] T. Saito et al. (BELLE Collaboration), Phys. Rev. D 91, 052004 (2015) doi: 10.1103/PhysRevD.91.052004
    [151] B. Aubert et al. (BABAR Collaboration), Phys. Rev. D 77, 051103 (2008) doi: 10.1103/PhysRevD.77.051103
    [152] J. P. Lees et al. (BABAR Collaboration), Phys. Rev. Lett. 109, 191801 (2012) doi: 10.1103/PhysRevLett.109.191801
    [153] J. P. Lees et al. (BABAR Collaboration), Phys. Rev. D 86, 052012 (2012) doi: 10.1103/PhysRevD.86.052012
    [154] H.-B. Zhang, G.-H. Luo, T.-F. Feng et al., Int. J. Mod. Phys. A 29, 1450196 (2014), arXiv:1409.6837 doi: 10.1142/S0217751X14501966
    [155] M. Abe et al., Prog. Theor. Exp. Phys. 2019(5), 053C02 (2019) doi: 10.1093/ptep/ptz030
    [156] R. Contino et al., CERN Yellow Rep. (2017) no.3, 255-440, CERN-TH-2016-113, arXiv: 1606.09408
    [157] G. Apollinari et al., CERN Yellow Rep. Monogr. 4 (2017) 1-516, CERN-2017-007-M
    [158] CEPC Study Group, IHEP-CEPC-DR-2018-02, arXiv: 1811.10545
    [159] S. Kawada, J. List, and M. Berggren, arXiv: 2009.04340
  • 加载中

Figures(10) / Tables(1)

Get Citation
Hai-Bin Zhang, Chang-Xin Liu, Jin-Lei Yang and Tai-Fu Feng. Muon anomalous magnetic dipole moment in the μνSSM[J]. Chinese Physics C. doi: 10.1088/1674-1137/ac71a6
Hai-Bin Zhang, Chang-Xin Liu, Jin-Lei Yang and Tai-Fu Feng. Muon anomalous magnetic dipole moment in the μνSSM[J]. Chinese Physics C.  doi: 10.1088/1674-1137/ac71a6 shu
Milestone
Received: 2022-02-16
Article Metric

Article Views(1116)
PDF Downloads(31)
Cited by(0)
Policy on re-use
To reuse of Open Access content published by CPC, for content published under the terms of the Creative Commons Attribution 3.0 license (“CC CY”), the users don’t need to request permission to copy, distribute and display the final published version of the article and to create derivative works, subject to appropriate attribution.
通讯作者: 陈斌, bchen63@163.com
  • 1. 

    沈阳化工大学材料科学与工程学院 沈阳 110142

  1. 本站搜索
  2. 百度学术搜索
  3. 万方数据库搜索
  4. CNKI搜索

Email This Article

Title:
Email:

Muon anomalous magnetic dipole moment in the μνSSM

    Corresponding author: Hai-Bin Zhang, hbzhang@hbu.edu.cn, Corresponding author
  • 1. Department of Physics, Hebei University, Baoding 071002, China
  • 2. Key Laboratory of High-precision Computation and Application of Quantum Field Theory of Hebei Province, Baoding 071002, China
  • 3. CAS Key Laboratory of Theoretical Physics, Institute of Theoretical Physics, Chinese Academy of Sciences, Beijing 100190, China
  • 4. School of Physical Sciences, University of Chinese Academy of Sciences, Beijing 100049, China
  • 5. College of Physics, Chongqing University, Chongqing 400044, China
  • 6. Department of Physics, Guangxi University, Nanning, 530004, China

Abstract: Recently, the Muon g-2 experiment at Fermilab measured the muon anomalous magnetic dipole moment (MDM), $ a_\mu=(g_\mu-2)/2 $, and reported that the new experimental average increases the difference between the experiment and the standard model (SM) prediction to 4.2σ. In this work, we reanalyze the muon anomalous MDM at the two-loop level in the μ from the ν Supersymmetric Standard Model ( $ \mu\nu $SSM) combined with the updated experimental average. The $ \mu\nu $SSM can explain the current difference between the experimental measurement and the SM theoretical prediction for the muon anomalous MDM, constrained by the 125 GeV Higgs boson mass and decays, the rare decay $ \bar{B}\rightarrow X_s\gamma $, and so on. We also investigate the anomalous MDM of the electron and tau lepton, $ a_e=(g_e-2)/2 $ and $ a_\tau=(g_\tau-2)/2 $, at the two-loop level in the $ \mu\nu $SSM. In addition, the decaying of the 125 GeV Higgs boson into a pair of charged leptons in the $ \mu\nu $SSM is analyzed.

    HTML

    I.   INTRODUCTION
    • The anomalous magnetic dipole moment (MDM) of a muon, $ a_\mu=(g_\mu-2)/2 $, has recently been measured by the Muon g-2 experiment at Fermilab [14], which reported that the result is 3.3 standard deviations (σ) greater than the standard model (SM) prediction based on its Run-1 data and is in agreement with the previous Brookhaven National Laboratory (BNL) E821 measurement [5]. Combined with previous E821 measurements, the new experimental average for the difference between the experimental measurements and the SM prediction [6] of $ a_\mu $ is given by

      $ \begin{array}{*{20}{l}} \Delta a_{\mu}=a_{\mu}^{\rm exp}-a_{\mu}^{\rm SM}=(25.1\pm5.9)\times10^{-10}, \end{array} $

      (1)

      which increases the difference between the experimental measurements and the SM theoretical prediction to 4.2σ. This result will further motivate the development of SM extensions. There are many research papers on the muon anomalous MDM, such as Refs. [792] and the references therein. However, it is worth mentioning that the latest result obtained by a lattice QCD calculation [93] of the leading order hadronic vacuum polarization contribution to $ a_\mu $ is larger than the previous result, which can accommodate the discrepancy between the experiment and the SM prediction, hence the discrepancy needs further scrutiny.

      In this work, we will analyze the muon anomalous MDM at the two-loop level in the μ from the ν Supersymmetric Standard Model ( $ \mu\nu $SSM) [94100], combined with the new experimental average. Through introducing three singlet right-handed neutrino superfields $ \hat{\nu}_i^c $ ($ i=1,2,3 $), the μνSSM can be used to solve the μ problem [101] of the minimal supersymmetric standard model (MSSM) [102106], and can generate three tiny neutrino masses through a TeV scale seesaw mechanism [95, 107113].

      The corresponding superpotential of the μνSSM is given as [94, 95]

      $ \begin{aligned}[b] W=&{\epsilon _{ab}}\left( {Y_{{u_{ij}}}}\hat H_u^b\hat Q_i^a\hat u_j^c + {Y_{{d_{ij}}}}\hat H_d^a\hat Q_i^b\hat d_j^c + {Y_{{e_{ij}}}}\hat H_d^a\hat L_i^b\hat e_j^c \right) \\ & + {\epsilon _{ab}}{Y_{{\nu _{ij}}}}\hat H_u^b\hat L_i^a\hat \nu _j^c - {\epsilon _{ab}}{\lambda _i}\hat \nu _i^c\hat H_d^a\hat H_u^b + \frac{1}{3}{\kappa _{ijk}}\hat \nu _i^c\hat \nu _j^c\hat \nu _k^c. \end{aligned} $

      (2)

      where $ a,b=1,2 $ are SU(2) indices with the antisymmetric tensor $ \epsilon_{12}=1 $, and $ i,j,k=1,2,3 $ are generation indices. The repeating indices imply the following summation convention. $ Y_{u,d,e,\nu} $, λ, and κ are dimensionless matrices, a vector, and a symmetric tensor, respectively. In the superpotential, the effective bilinear terms $ \epsilon _{ab} \varepsilon_i \hat H_u^b\hat L_i^a $ and $ \epsilon _{ab} \mu \hat H_d^a\hat H_u^b $ can be generated with $ \varepsilon_i= Y_{\nu _{ij}} \langle {\tilde \nu _j^c} \rangle $ and $ \mu = {\lambda _i}\langle {\tilde \nu _i^c} \rangle $ once the electroweak symmetry is broken. The general soft SUSY-breaking terms, the usual D- and F-term contributions of the tree-level scalar potential, and the mass matrices of the particles in the μν SSM can be seen in Refs. [95, 96, 99]. In the μνSSM, the gravitino or the axino can be dark matter candidates [95, 96, 110, 114119].

      In our previous work, the Higgs boson mass and decay modes $ h\rightarrow \gamma\gamma $, $ h\rightarrow VV^* $ ($ V=Z,W $), $ h\rightarrow f\bar{f} $ ($ f=b,\tau $), and $ h\rightarrow Z\gamma $ in the $ \mu\nu $SSM were researched [120124]. Constrained by the 125 GeV Higgs boson mass and decays, herein we will investigate the anomalous MDM of the charged leptons at the two-loop level in the $ \mu\nu $SSM, combined with the updated experimental average of the muon MDM. For the electron anomalous MDM, $ a_e=(g_e-2)/2 $, the experimental result showed a negative $ \sim2.4\sigma $ discrepancy between the measured value [125] and the SM prediction [126]. However, a new determination of the fine structure constant with a higher accuracy [127], obtained from a measurement of the recoil velocity on rubidium atoms, resulted in a re-evaluation of $ a_e $ in the SM, revising it to a positive $ \sim1.6\sigma $ discrepancy

      $ \begin{array}{*{20}{l}} &&\bigtriangleup a_e\equiv a_e^{\rm exp}-a_e^{\rm SM}=(4.8\pm3.0)\times10^{-13}. \end{array} $

      (3)

      Interestingly, now $ \bigtriangleup a_e $ and $ \bigtriangleup a_\mu $ are all positive.

      Now, the measured averages of the signal strengths for the 125 GeV Higgs boson decays into two taus and bottom quarks relative to the standard model (SM) prediction are respectively $ 1.15^{+0.16}_{-0.15} $ and $ 1.04\pm0.13 $ with high experimental precision [128]. Although Higgs boson decays into a pair of fermions of the third generation can now be measured accurately by the Large Hadron Collider (LHC), the Higgs boson decays into a pair of fermions of the first or second generation are challenging to measure, as the Yukawa couplings of the 125 GeV Higgs boson to fermions of the first and second generation are smaller than that of the third generation. However, the ATLAS and CMS Collaborations recently measured the 125 GeV Higgs boson decay into a pair of muons $ h\rightarrow \mu \bar{\mu} $, and reported that the signal strength relative to the SM prediction is $ 1.2\pm0.6 $ with 2.0σ [129] and $ 1.19^{+0.40+0.15}_{-0.39-0.14} $ with 3.0σ [130], respectively. The dimuon decay of the 125 GeV Higgs boson $ h\rightarrow \mu \bar{\mu} $ offers the best opportunity for measuring Higgs interactions with second-generation fermions at the LHC. The 125 GeV Higgs boson decay $ h\rightarrow \mu \bar{\mu} $has been discussed within various theoretical frameworks [131143]. Herein, we investigate the 125 GeV Higgs boson decay $ h\rightarrow \mu \bar{\mu} $ at the one-loop level in the $ \mu\nu $SSM.

      In the following, we briefly introduce the MDM of the charged leptons in Sec. II. In Sec. III, we give the decay width of the 125 GeV Higgs boson decays into a pair of charged leptons $ h\rightarrow l_i \bar{l}_i $ at the one-loop level. Sec. IV and Sec. V respectively show the numerical analysis and summary.

    II.   MDM of the charged leptons
    • The MDM of the charged leptons in the $ \mu\nu $SSM can be written by the effective Lagrangian

      $ \mathcal{L}_{\rm MDM}={e\over 4m_{l_i}}a_{l_i}\overline{l}_{i}\sigma^{\alpha \beta}l_{i}F_{\alpha \beta}, $

      (4)

      where $ l_i $ represents the charged leptons, which are on-shell, $ m_{l_i} $ is the mass of the charged leptons, $ \sigma^{\alpha\beta}=({\rm i}/{2})[\gamma^\alpha,\gamma^\beta] $, $ F_{\alpha\beta} $ denotes the electromagnetic field strength and the MDM of the charged leptons is $ a_{l_i}=({1}/{2})(g_{l_i}-2) $. Including the main two-loop electroweak corrections, the MDM of the charged leptons in the $ \mu\nu $SSM can be given by

      $ \begin{array}{*{20}{l}} &&a_{l_i}^{\rm{SUSY}}=a_{l_i}^{\rm{one-loop}}+a_{l_i}^{\rm{two-loop}}, \end{array} $

      (5)

      where the one-loop corrections $ a_{l_i}^{\rm{one-loop}} $ are pictured in Fig. 1 and the main two-loop corrections $ a_{l_i}^{\rm{two-loop}} $ are shown in Fig. 2.

      Figure 1.  Dominant one-loop diagrams representing the contributions from neutral fermions $ \chi_\eta^0 $ and charged scalar $ S_{ \alpha}^- $ loops (a), and the contributions from charged fermions $ \chi_\beta $ and neutral scalar $ S_{ \alpha} $ (or $ P_{ \alpha} $) loops (b).

      Figure 2.  Main two-loop rainbow diagram (a) and Barr-Zee type diagrams (b, c).

      In Fig. 1, the contributions of the charged leptons to the MDM at the one-loop level in the $ \mu\nu $SSM come from neutral fermions and charged scalar loops (neutral fermions $ \chi_{\eta}^{0} $ and charged scalars $ S_{ \alpha}^- $ are loop particles) and the charged fermions and neutral scalar loop (charged fermions $ \chi_{\beta} $ and neutral scalars $ N_\alpha=S_{ \alpha},P_{ \alpha} $ are loop particles). The concrete expressions of the one-loop corrections $ a_{l_i}^{\rm{one-loop}} $ can be found in our previous related work [122] by replacing the charged leptons $ {l_i} $ with the muon $ {l_\mu} $.

      Here, the dominant contribution of the muon MDM $ a_\mu $ comes from the charged fermions and neutral scalar loops in Fig. 1(b). We check that the one-loop correction in the $ \mu\nu $SSM is approximately in agreement with the MSSM and the Next-to-Minimal Supersymmetric Standard Model (NMSSM) [10, 64, 82]. Although the MDM of the muon in the $ \mu\nu $SSM has roughly the same properties in the MSSM and NMSSM, it is subject to significantly relaxed limitations in parameter space in the $ \mu\nu $SSM if other physical quantities are researched. Of course, through introducing three singlet right-handed neutrino superfields $ \hat{\nu}_i^c $ ($ i=1,2,3 $) for solving the μ problem of the MSSM and generating three tiny neutrino masses, the μνSSM still can give some additional contributions to the muon MDM $ a_\mu $ beyond the MSSM.

      In Fig. 2, the main two-loop rainbow diagram (a) and the Barr-Zee type diagrams (b, c) of $ a_{l_i} $ in the $ \mu\nu $SSM are shown, in which a closed fermion loop is attached to virtual gauge bosons or scalars, and the corresponding corrections for $ a_{l_i} $ are obtained by attaching a photon in all possible ways to the internal particles. In our previous work [123], we show the main two-loop contributions of the muon MDM in the approximation $ m_{\chi_{\eta}^{0}}\simeq m_{\chi_{\beta}} $. In this paper, we give the main two-loop contributions $ a_{l_i}^{\rm{two-loop}} $ for the general case.

      In the $ \mu\nu $SSM, the main SUSY two-loop corrections of the MDM of the charged leptons can be given as

      $ \begin{array}{*{20}{l}} a_{l_i}^{\rm{two-loop}}=a_{l_i}^{WW}+a_{l_{i}}^{WS}+a_{l_i}^{\gamma h}, \end{array} $

      (6)

      where the terms $ a_{l_i}^{WW},a_{l_i}^{WS},a_{l_i}^{\gamma h} $ are the contributions corresponding to Figs. 2 (a−c). The contribution from the main two-loop rainbow diagram in Fig. 2(a) can be written as

      $ \begin{aligned}[b] a_{l_i}^{WW}=&{G_{_F}m_{l_i}^2\over 8\sqrt{2}\pi^4} \Bigg\{\Bigg(\Big|C_{\rm L}^{W \overline{\chi}_{\eta}^{0}\chi_{\beta}}\Big|^2+\Big|C_{\rm R}^{W\overline{\chi}_{\eta}^{0}\chi_{\beta}}\Big|^2\Bigg) T_1(1,x_{{\chi_{\eta}^{0}}},x{_{\chi_\beta}})\\ & +\Bigg(\Big|C_{\rm L}^{W\overline{\chi}_{\eta}^{0}\chi_{\beta}}\Big|^2-\Big|C_{\rm R}^{W\overline{\chi}_{\eta}^{0}\chi_{\beta}}\Big|^2\Bigg) T_2(1,x_{{\chi_{\eta}^{0}}},x_{{\chi_\beta}}) \end{aligned} $

      $ \begin{aligned}[b]\quad\quad\quad +2(x_{{\chi_{\eta}^{0}}}x_{{\chi_\beta}})^{1/2}\Re\Big(C_{\rm R}^{W\overline{\chi}_{\eta}^{0}\chi_{\beta}*} C_{\rm L}^{W\overline{\chi}_{\eta}^{0}\chi_{\beta}}\Big)T_3(1,x_{{\chi_{\eta}^{0}}},x{_{\chi_\beta}})\Bigg\}\;, \end{aligned} $

      (7)

      with $ x_i=m_i^2/m_W^2 $. The expressions of the form factors $ T_i $ can be found in Refs. [144146]. The concrete expressions for couplings C in the $ \mu\nu $SSM can be seen in Ref. [99].

      The contribution from the main two-loop Barr-Zee type diagram in Fig. 2 (b) can be given by

      $ \begin{aligned}[b] a_{l_{i}}^{WS}=&{G_{\rm F}m_{l_{i}}m_{W}\over128\pi^4g_2}\Re{( C_{\rm L}^{S_{ \alpha}^-\overline{l}_i{\chi_{7+i}^0}} )}\\ & \times\Bigg\{(x_{{\chi_\beta}})^{1/2} F_1(1,x_{S_{\alpha}^-},x_{{\chi_{\eta}^{0}}},x_{{\chi_\beta}}) \\&\times\Re\Big(C_{\rm L}^{S_{ \alpha}^-\overline\chi_{\beta}{\chi}_{\eta}^{0}}C_{\rm L}^{W \overline{\chi}_{\eta}^{0}\chi_{\beta}}+C_{\rm R}^{S_{ \alpha}^-\overline\chi_{\beta}{\chi}_{\eta}^{0}}C_{\rm R}^{W \overline{\chi}_{\eta}^{0}\chi_{\beta}}\Big) \\ & +(x_{{\chi_{\eta}^{0}}})^{1/2} F_2(1,x_{{S_{ \alpha}^-}},x_{{\chi_{\eta}^{0}}},x_{{\chi_\beta}})\\& \times\Re\Big(C_{\rm L}^{S_{ \alpha}^-\overline\chi_{\beta}{\chi}_{\eta}^{0}}C_{\rm R}^{W \overline{\chi}_{\eta}^{0}\chi_{\beta}}+C_{\rm R}^{S_{ \alpha}^-\overline\chi_{\beta}{\chi}_{\eta}^{0}}C_{\rm L}^{W \overline{\chi}_{\eta}^{0}\chi_{\beta}}\Big) \\ & +(x_{{\chi_\beta}})^{1/2} F_3(1,x_{S_{ \alpha}^-},x_{{\chi_{\eta}^{0}}},x_{{\chi_\beta}}) \\&\times\Re\Big(C_{\rm L}^{S_{ \alpha}^-\overline\chi_{\beta}{\chi}_{\eta}^{0}}C_{\rm L}^{W \overline{\chi}_{\eta}^{0}\chi_{\beta}}-C_{\rm R}^{S_{ \alpha}^-\overline\chi_{\beta}{\chi}_{\eta}^{0}}C_{\rm R}^{W \overline{\chi}_{\eta}^{0}\chi_{\beta}}\Big) \\ & +(x_{{\chi_{\eta}^{0}}})^{1/2} F_4(1,x_{S_{ \alpha}^-},x_{{\chi_{\eta}^{0}}},x_{{\chi_\beta}})\\& \times\Re\Big(C_{\rm L}^{S_{ \alpha}^-\overline\chi_{\beta}{\chi}_{\eta}^{0}}C_{\rm R}^{W \overline{\chi}_{\eta}^{0}\chi_{\beta}}-C_{\rm R}^{S_{ \alpha}^-\overline\chi_{\beta}{\chi}_{\eta}^{0}}C_{\rm L}^{W \overline{\chi}_{\eta}^{0}\chi_{\beta}}\Big)\Bigg\}\;, \end{aligned} $

      (8)

      where the expressions of the form factors $ F_{i} $ can be seen in Ref. [144]. Here, in the $ \mu\nu $SSM, h denotes $ S_{ 1} $, $ l_i $ is denoted by $ {\chi}_{2+i} $. Considering that the masses of the charged scalars $ S_{ \alpha}^{-} $ are larger than the mass of a W gauge boson constrained by the present experiments, the contribution from the main two-loop Barr-Zee type diagram $ a_{l_{i}}^{WS} $ is smaller than the contribution from the main two-loop rainbow diagram $ a_{l_i}^{ WW} $.

      The contribution from the main two-loop Barr-Zee type diagram in Fig. 2(c) can be written as

      $ a_{l_{i}}^{\gamma h}={{-G_{\rm F} m_{l_i}m_{W} s_W^2} \over {16\pi^4}}(x_{{\chi_\beta}})^{1/2} T_{11}(x_{{h}},x_{{\chi_{\beta}}},x_{{\chi_{\beta}}})\Re\Big(C_{\rm L}^{h \overline{l}_i {l}_{i}} C_{\rm L}^{h\overline{\chi}_{\beta}{\chi}_{\beta}}\Big)\;. $

      (9)

      Through the numerical calculation, normalized to the one-loop corrections $ a_{l_i}^{\rm{one-loop}} $, the two-loop corrections of the MDM $ a_{l_i}^{\rm{two-loop}} $ in the $ \mu\nu $SSM may reach about 10$ \% $, when $ \tan\beta $ is large, and the masses of the superpartners are small and constrained by the experiments. Therefore, one-loop correction alone is sufficient for explaining the g-2 of a muon and satisfying all other experimental constraints. In the following numerical analysis, the two-loop corrections of the muon MDM are still considered to be more precise.

    III.   ${\boldsymbol {h\rightarrow l_i \bar{l}_i}}$ IN THE ${\boldsymbol {\mu\nu}}$SSM
    • The corresponding effective amplitude for the 125 GeV Higgs decay $ h\rightarrow l_i \bar{l}_i $ can be written as

      $ \mathcal{M}= h{\bar l_i}({F_{\rm L}^{i}}{P_{\rm L}} + {F_{\rm R}^{i}}{P_{\rm R}}){l_i}. $

      (10)

      The decay width of $ h\rightarrow l_i\bar{l}_i $ can be obtained as

      $ {\Gamma}(h\rightarrow l_i\bar{l}_i) \simeq \frac{m_h}{16\pi}\Big({\left| {F_{\rm L}^{i}} \right|^2} + {\left| {F_{\rm R}^{i}} \right|^2}\Big). $

      (11)

      The contribution from the tree level in the $ \mu\nu $SSM can be written as

      $ F_{\rm L}^{({\rm tree})i}=F_{\rm R}^{({\rm tree})i} = \frac{m_{l_i}}{\sqrt{2}\upsilon\cos \beta}R_{S_{ 11}}, $

      (12)

      where $ m_{l_i} $ denotes the mass of the lepton $ l_i $, $ \upsilon\simeq174 $ GeV, and $ R_S $ is the unitary matrix which diagonalizes the mass matrix of CP-even neutral scalars [120]. In the SM, the contribution from the tree level can be written by

      $ F_{{\rm L}(\rm{SM})}^{({\rm tree})i}=F_{{\rm R}(\rm{SM})}^{({\rm tree})i} = \frac{m_{l_i}}{\sqrt{2}\upsilon}. $

      (13)

      The running lepton masses $ m_{l_i}(\Lambda) $ are related to the pole masses $ m_{l_i} $ through [147]

      $ m_{l_i}(\Lambda)=m_{l_i}\Bigg\{ 1-\frac{\alpha(\Lambda)}{\pi} \Bigg[1+\frac{3}{4} \ln \frac{\Lambda^2}{m_{l_i}^2}\Bigg]\Bigg\}. $

      (14)

      Similarly to the decays $ h\rightarrow l_i\bar{l}_i $, the decay width of the 125 GeV Higgs decay into down-type quarks $ h\rightarrow d_i \bar{d}_i $ can be given as

      $ {\Gamma}(h\rightarrow d_i \bar{d}_i) \simeq \frac{N_c m_h}{16\pi}\Big({\left| {F_{dL}^{i}} \right|^2} + {\left| {F_{dR}^{i}} \right|^2}\Big), $

      (15)

      with $ N_c=3 $, and the tree level contribution in the $ \mu\nu $SSM is

      $ F_{dL}^{({\rm tree})i}=F_{dR}^{({\rm tree})i} = \frac{m_{d_i}}{\sqrt{2}\upsilon\cos \beta}R_{S_{ 11}}, $

      (16)

      where $ m_{d_i} $ denotes the mass of the down-type quarks $ d_i $. In the SM, the contribution from the tree level can be written by

      $ F_{dL(\rm{SM})}^{({\rm tree})i}=F_{dR(\rm{SM})}^{({\rm tree})i} = \frac{m_{d_i}}{\sqrt{2}\upsilon}. $

      (17)

      The difference between the decay width of $ h\rightarrow f_i \bar{f}_i $ of the $ \mu\nu $SSM ($ {\Gamma}_{\rm{NP}}(h\rightarrow f_i \bar{f}_i) $) and that of the SM ($ {\Gamma}_{\rm{SM}}(h\rightarrow f_i \bar{f}_i) $) in the tree level can be given as

      $ \delta_{\rm tree}\equiv {{\Gamma}_{\rm{NP}}(h\rightarrow f_i \bar{f}_i)-{\Gamma}_{\rm{SM}}(h\rightarrow f_i \bar{f}_i)\over {\Gamma}_{\rm{SM}}(h\rightarrow f_i \bar{f}_i)}=\frac{R_{S_{ 11}}^2}{\cos^2 \beta}-1. $

      (18)

      Here,$ f_i=l_i,\,d_i $, due to the fact that the tree-level contribution of the Higgs boson decay into leptons is identical to that for the Higgs boson decay into down-tpye quarks. The numerical results can show that the ratio $ \delta_{\rm tree} $ is about $ 1\% $ when the parameter $ \tan\beta $ in the $ \mu\nu $SSM is small.

      The one-loop electroweak correction for $ h\rightarrow l_i\bar{l}_i $ in the SM is approximated by [133137]

      $ {\Gamma}_{\rm SM}^{({\rm one})}(h\rightarrow l_i\bar{l}_i) \simeq {\Gamma}_{\rm SM}^{({\rm tree})}(h\rightarrow l_i\bar{l}_i)\delta_{\rm week}^{l}, $

      (19)

      with

      $ \begin{aligned}[b] \delta_{\rm week}^{l}=&\frac{G_{\rm F}}{8\pi^2 \sqrt{2}}\Bigg[ 7m_t^2 + m_W^2\Bigg(-5 + \frac{3\log{c_W^2}}{s_W^2} \Bigg) \\&- m_Z^2 \frac{6(1-8s_W^2+16s_W^4)-1}{2} \Bigg], \end{aligned} $

      (20)

      where the contributions come from the t quark, W boson and Z boson. The numerical result shows that the one-loop electroweak contribution relative to the tree contribution $ \delta_{\rm week}^{l} $ is about 1.7%.

      The one-loop diagrams for $ h\rightarrow l_i\bar{l}_i $ in the $ \mu\nu $SSM beyond the SM are depicted in Fig. 3. Then, the contributions from the one-loop diagrams in the $ \mu\nu $SSM can be written by

      Figure 3.  One-loop diagrams for $ h\rightarrow l_i\bar{l}_i $ in the $ \mu\nu $SSM. (a, b) represent the contributions from the charged scalar $ S_{\alpha,\,\rho}^- $ and neutral fermion $ \chi_{\eta,\varsigma}^0 $ loops, while (c, d) represent the contributions from the neutral scalar $ N_{\alpha,\,\rho} $ ($ N=S,P $) and charged fermion $ \chi_{\beta,\zeta} $ loops.

      $ \begin{array}{*{20}{l}} F_{\rm L,R}^{({\rm one})i} = F_{\rm L,R}^{(a)i} + F_{\rm L,R}^{(b)i} + F_{\rm L,R}^{(c)i} + F_{\rm L,R}^{(d)i}, \end{array} $

      (21)

      where $ F_{\rm L,R}^{(a,b)i} $ denotes the contributions from the charged scalar $ S_{ \alpha,\rho}^- $ and neutral fermion $ \chi_{\eta,\varsigma}^0 $ (upper index 0 shows neutral) loops, and $ F_{\rm L,R}^{(c,d)i} $ stands for the contributions from the neutral scalar $ N_{\alpha,\,\rho} $ ($ N=S,P $) and charged fermion $ \chi_{\beta,\zeta} $ loops.

      After integrating the heavy freedoms out, we formulate the neutral fermion loop contributions $ F_{\rm L,R}^{(a,b)i} $ as follows:

      $ \begin{aligned}[b]F_{\rm L}^{(a)i} =& \frac{{m_{{\chi _\eta ^0}}}{C^{S^\pm}_{1 \alpha \rho }}}{{m_W^2}} C_{\rm L}^{S_\rho ^ - {{\bar l }_{i}} \chi _\eta ^0} C_{\rm L}^{S_\alpha ^{-\ast} \bar \chi _\eta ^0 {l_{i}}} {G_1}({x_{\chi _\eta ^0}},{x_{S_{ \alpha} ^ - }},{x_{S_\rho ^ - }}) ,\\ F_{\rm L}^{(b)i} = & \frac{{m_{{\chi _\varsigma^0 }}}{m_{{\chi _\eta^0 }}}}{{m_W^2}} C_{\rm L}^{{S_{ \alpha}^- }{{\bar l}_{i}}{\chi _\varsigma^0 }}C_{\rm L}^{h{{\bar \chi }_\varsigma^0 }{\chi _\eta^0 }} C_{\rm L}^{{S_{ \alpha}^{-\ast} }{{\bar \chi }_\eta^0}{l_{i}}}{G_1}({x_{{S_{ \alpha}^- }}},{x_{{\chi _\varsigma^0 }}},{x_{{\chi _\eta^0 }}})\\ & + \: C_{\rm L}^{{S_{ \alpha}^- }{{\bar l}_{i}}{\chi _\varsigma^0 }}C_{\rm R}^{h{{\bar \chi }_\varsigma^0 }{\chi _\eta^0 }} C_{\rm L}^{{S_\alpha^{-\ast} }{{\bar \chi }_\eta^0}{l_{i}}}{G_2}({x_{{S_{ \alpha}^- }}},{x_{{\chi _\varsigma^0 }}},{x_{{\chi _\eta^0 }}}) ,\\ F_{\rm R}^{(a,b)i} =& \left. {F_{\rm L}^{(a,b)i}} \right|{ _{{\rm L} \leftrightarrow {\rm R}}} . \end{aligned} $

      (22)

      Here, the concrete expressions for the couplings C can be found in Refs. [121, 122], and the loop functions $ G_{i} $ are given as

      $ \begin{aligned}[b] {G_1}({x_1 , x_2 , x_3}) = & \frac{1}{{16{\pi ^2}}}\Bigg[ \frac{{{x_1}\ln {x_1}}}{{({x_1} - {x_2})({x_1} - {x_3})}} + \frac{{{x_2}\ln {x_2}}}{{({x_2} - {x_1})({x_2} - {x_3})}} \\ & + \frac{{{x_3}\ln {x_3}}}{{({x_3} - {x_1})({x_3} - {x_2})}}\Bigg],\\[-10pt] \end{aligned} $

      (23)

      $ \begin{aligned}[b] {G_2}({x_1 , x_2 , x_3}) = & \frac{1}{{16{\pi ^2}}}\Bigg[ \frac{{x_1^2\ln {x_1}}}{{({x_1} - {x_2})({x_1} - {x_3})}} + \frac{{x_2^2\ln {x_2}}}{{({x_2} - {x_1})({x_2} - {x_3})}} \\ & + \frac{{x_3^2\ln {x_3}}}{{({x_3} - {x_1})({x_3} - {x_2})}} \Bigg].\quad\;\; \\[-10pt]\end{aligned} $

      (24)

      In a similar way, the charged fermion loop contributions $ F_{\rm L,R}^{(c,d)i} $ are

      $ \begin{aligned}[b] F_{\rm L}^{(c)i} =& \sum\limits_{N=S,P} \frac{{m_{{\chi _\beta }}}{C^{N}_{1 \alpha \rho }}}{{m_W^2}} C_{\rm L}^{N_\rho {{\bar l }_{i}}\chi _\beta } C_{\rm L}^{N_\alpha \bar \chi _\beta {l_{i}} } {G_1}({x_{\chi _\beta }},{x_{N_\alpha }},{x_{N_\rho }}) ,\\ F_{\rm L}^{(d)i} =& \sum\limits_{N=S,P} \Big[ C_{\rm L}^{{N_\alpha }{{\bar l}_{i}}{\chi _\zeta }}C_{\rm R}^{h{{\bar \chi }_\zeta }{\chi _\beta }}C_{\rm L}^{{N_\alpha }{{\bar \chi }_\beta }{l_{i}}} {G_2}({x_{{N_\alpha }}},{x_{{\chi _\zeta }}},{x_{{\chi _\beta }}})\\ &+ \frac{{m_{{\chi _\zeta }}}{m_{{\chi _\beta }}}}{{m_W^2}} C_{\rm L}^{{N_\alpha }{{\bar l}_{i}}{\chi _\zeta }}C_{\rm L}^{h{{\bar \chi }_\zeta }{\chi _\beta }} C_{\rm L}^{{N_\alpha }{{\bar \chi }_\beta }{l_{i}}}{G_1}({x_{{N_\alpha }}},{x_{{\chi _\zeta }}},{x_{{\chi _\beta }}}) \Big],\\ F_{\rm R}^{(c,d)i} =& \left. {F_{\rm L}^{(c,d)i}} \right|{ _{{\rm L} \leftrightarrow {\rm R}}} . \end{aligned} $

      (25)
    IV.   NUMERICAL ANALYSIS
    • Firstly, we take some appropriate parameter space in the $ \mu\nu $SSM. For soft SUSY-breaking mass squared parameters, we make the minimal flavor violation (MFV) assumptions

      $ \begin{aligned}[b] &m_{\tilde Q_{ij}}^2 = m_{{{\tilde Q_i}}}^2{\delta _{ij}}, \quad m_{\tilde u_{ij}^c}^2 = m_{{{\tilde u_i}^c}}^2{\delta _{ij}}, \quad m_{\tilde d_{ij}^c}^2 = m_{{{\tilde d_i}^c}}^2{\delta _{ij}}, \\ &m_{{{\tilde L}_{ij}}}^2 = m_{{\tilde L}}^2{\delta _{ij}}, \quad m_{\tilde e_{ij}^c}^2 = m_{{{\tilde e}^c}}^2{\delta _{ij}}, \quad m_{\tilde \nu_{ij}^c}^2 = m_{\tilde \nu_{i}^c}^2{\delta _{ij}}, \end{aligned} $

      (26)

      where $ i,\;j,\;k =1,\;2,\;3 $. $ m_{\tilde \nu_i^c}^2 $ can be constrained by the minimization conditions of the neutral scalar potential seen in Ref. [120]. For some coupling parameters, we also choose the MFV assumptions

      $ \begin{aligned}[b] &{\kappa _{ijk}} = \kappa {\delta _{ij}}{\delta _{jk}}, \quad {({A_\kappa }\kappa )_{ijk}} = {A_\kappa }\kappa {\delta _{ij}}{\delta _{jk}}, \quad \upsilon_{\nu_i^c}=\upsilon_{\nu^c}, \\& \lambda _i = \lambda,\quad {({A_\lambda }\lambda )}_i = {A_\lambda }\lambda,\quad {Y_{{e_{ij}}}} = {Y_{{e_i}}}{\delta _{ij}},\\& {({A_e}{Y_e})_{ij}} = {A_{e}}{Y_{{e_i}}}{\delta _{ij}}, \quad {Y_{{\nu _{ij}}}} = {Y_{{\nu _i}}}{\delta _{ij}},\quad (A_\nu Y_\nu)_{ij}={a_{{\nu_i}}}{\delta _{ij}}, \end{aligned} $

      (27)

      In our previous work [113], we have discussed in detail how the neutrino oscillation data constrain left-handed sneutrino VEVs $ \upsilon_{\nu_i} \sim \mathcal{O}(10^{-4}\;{\rm{GeV}}) $ and neutrino Yukawa couplings $ Y_{\nu_i} \sim \mathcal{O}(10^{-7}) $ in the $ \mu\nu $SSM via the TeV scale seesaw mechanism. In the following, we choose $ m_{\nu_1} =10^{-2} $ eV as the lightest neutrino and assume the neutrino mass spectrum with normal ordering, using neutrino oscillation experimental data [128] to constrain the parameters $ \upsilon_{\nu_i} $ and $ Y_{\nu_i} $. Considering experimental data on quark mixing, one can have

      $ \begin{aligned}[b] &\;\,{Y_{{u _{ij}}}} = {Y_{{u _i}}}{V_{L_{ij}}^u},\quad (A_u Y_u)_{ij}={A_{u_i}}{Y_{{u_{ij}}}},\\ &{Y_{{d_{ij}}}} = {Y_{{d_i}}}{V_{L_{ij}}^d},\quad (A_d Y_d)_{ij}={A_{d}}{Y_{{d_{ij}}}}, \end{aligned} $

      (28)

      and $ V=V_L^u V_L^{d\dagger} $ denotes the CKM matrix.

      $ {Y_{{u_i}}} = \frac{{{m_{{u_i}}}}}{{{\upsilon_u}}},\qquad {Y_{{d_i}}} = \frac{{{m_{{d_i}}}}}{{{\upsilon_d}}},\qquad {Y_{{e_i}}} = \frac{{{m_{{l_i}}}}}{{{\upsilon_d}}}, $

      (29)

      where the $ m_{u_{i}},\;m_{d_{i}} $, and $ m_{l_{i}} $ stand for the up-quark, down-quark, and charged lepton masses, respectively.

      Through analysis of the parameter space of the $ \mu\nu $SSM [95], we can choose the reasonable parameter values of $ \kappa=0.4 $, $ {A_{\kappa}}=-300\;{\rm GeV} $, $ \lambda=0.1 $, $ A_\lambda=500\;{\rm GeV} $, and $ A_{u_{1,2}}=A_{d}=A_{e}=1\;{\rm TeV} $ for simplicity. Considering the direct search for supersymmetric particles [128], we take $ m_{{\tilde Q}_{1,2,3}}=m_{{\tilde u_{1,2}}^{c}}=m_{{\tilde d_{1,2,3}}^{c}}=2\;{\rm TeV} $, $ M_3=2.5\;{\rm TeV} $. For simplicity, we will choose the gauginos' Majorana masses $ M_{1}=M_2 $. As key parameters, $ A_{u_{3}}\equiv A_t $, $ m_{{\tilde u}^c_3} $ and $ \tan\beta \equiv \upsilon_u/\upsilon_d $ greatly affect the lightest Higgs boson mass. Therefore, the free parameters that affect our next analysis are

      $ \begin{array}{*{20}{l}} \tan \beta ,\quad \upsilon_{\nu^c}, \quad M_2, \quad m_{{\tilde L}}, \quad m_{{{\tilde e}^c}},\quad m_{{\tilde u}^c_3}, \quad A_t. \end{array} $

      (30)

      To present a numerical analysis, we random scan the parameter space shown in Table 1. Considering that the light stop mass is easily ruled out by the experiment, we scan the parameter $ m_{{\tilde u}^c_3} $ from 1 TeV. Now, the average measured mass of the Higgs boson is [128]

      Parameters Min Max
      $ \tan \beta $ 4 40
      $ v_{\nu^{c}}/{\rm TeV} $ 1 6
      $ M_2/{\rm TeV} $ 0.3 2
      $ m_{{\tilde L}}=m_{{{\tilde e}^c}}/{\rm TeV} $ 0.5 2
      $ m_{{\tilde u}^c_3}/{\rm TeV} $ 1 4
      $ A_{t}/{\rm TeV} $ 1 4

      Table 1.  Random scan parameters.

      $ \begin{array}{*{20}{l}} m_h=125.25\pm 0.17\: {\rm{GeV}}, \end{array} $

      (31)

      where the accurate Higgs boson mass can give stringent constraints for the parameter space of the model. In our previous work [120], the Higgs boson masses in the $ \mu\nu $SSM, including the main two-loop radiative corrections are discussed. Through the work, herein, the scanning results are constrained by the lightest Higgs boson mass with $ 124.68\leq m_{{h}} \leq125.52\;{\rm GeV} $, where a $ 3 \sigma $ experimental error is considered. For the signal strengths of the light Higgs boson decay modes $ h \rightarrow \gamma\gamma, \;WW^*, \;ZZ^*, \; b\bar b, \;\tau\bar\tau, \;\mu\bar\mu $, we adopt the averages of the results from PDG, which reads [128]

      $ \begin{aligned}[b] &\mu_{\gamma\gamma}^{\rm exp}=1.11_{-0.09}^{+0.10},\quad \mu_{WW^*}^{\rm exp}=1.19\pm0.12,\\& \mu_{ZZ^*}^{\rm exp}=1.06\pm0.09,\quad\mu_{b\bar b}^{\rm exp}=1.04\pm0.13,\\& \mu_{\tau\bar\tau}^{\rm exp}=1.15_{-0.15}^{+0.16},\quad \mu_{\mu\bar\mu}^{\rm exp}=1.19\pm0.34. \end{aligned} $

      (32)

      Here, a $ 2 \sigma $ experimental error will be considered in the scanning results, using our previous work [121] on the signal strengths of the Higgs boson decay channels $ h\rightarrow \gamma\gamma $, $ h\rightarrow VV^* $ ($ V=Z,W $), and $ h\rightarrow f\bar{f} $ ($ f=b,\tau $) in the $ \mu\nu $SSM.

      There is a close similarity between the anomalous MDM of a muon and the branching ratio of $ \bar{B}\rightarrow X_s\gamma $ in the supersymmetric model [14]. They both obtain large $ \tan\beta $ enhancements from the down-fermion Yukawa couplings, $ {Y_{{d_i}}} = {{{m_{{d_i}}}}}\,/\,{{{\upsilon_d}}} = {{{m_{{d_i}}\sqrt{\tan^2\beta+1}}}}\,/\,{{{\upsilon}}} $ and $ {Y_{{e_i}}} = {{{m_{{l_i}}}}}\,/\,{{{\upsilon_d}}} = {{{m_{{l_i}}\, \times \sqrt{\tan^2\beta+1}}}}/{{{\upsilon}}} $ with $ \upsilon=\sqrt{\upsilon_d^2+\upsilon_u^2}\simeq 174 $ GeV. Combined with the experimental data from CLEO [148], BELLE [149, 150], and BABAR [151153], the current experimental value for the branching ratio of $ \bar{B}\rightarrow X_s\gamma $ is [128]

      $ \begin{array}{*{20}{l}} {\rm{Br}}(\bar{B}\rightarrow X_s\gamma)=(3.49\pm0.19)\times10^{-4}. \end{array} $

      (33)

      Using our previous work about the rare decay $ \bar{B}\rightarrow X_s\gamma $ in the $ \mu\nu $SSM [154], the following results of scanning are also constrained by $ 2.92\times 10^{-4} \leq {\rm{Br}}(\bar{B}\rightarrow X_s\gamma) \leq 4.06\times 10^{-4} $, where a $ 3 \sigma $ experimental error is considered.

    • A.   MDM of charged leptons

    • Firstly, to illustrate clearly the cross-correlation of the model parameters, we plot $ a_\mu^{\rm{SUSY}} $ varying with $ \upsilon_{\nu^c} $ with different $ M_2 $ and $ \tan \beta $ in Fig. 4, choosing $ m_{{\tilde L}}=m_{{{\tilde e}^c}}=0.7 $ TeV and $ m_{{\tilde u}^c_3}=A_t=1 $ TeV for simplicity. In Fig 4(a), the solid line denotes $ M_2=0.3 $ TeV, the dashed line denotes $ M_2=1 $ TeV, and the dotted line denotes $ M_2=2 $ TeV with $ \tan \beta =40 $. The numerical results show that the muon anomalous MDM $ a_\mu^{\rm{SUSY}} $ is decoupling with increasing $ \upsilon_{\nu^c} $ or $ M_2 $, which can affect the masses of the charginos and neutralinos. In Fig 4(b), the solid line represents $ \tan \beta =40 $, the dashed line represents $ \tan \beta =25 $, and the dotted line represents $ \tan \beta =15 $, with $ M_2=0.3 $ TeV. Through Fig. 4 (b), we can see that the muon anomalous MDM $ a_\mu^{\rm{SUSY}} $obtains large $ \tan\beta $ enhancements, which is similar to that in MSSM.

      Figure 4.  (color online) $ a_\mu^{\rm{SUSY}} $ versus $ \upsilon_{\nu^c} $ with different $ M_2 $ (a) and $ \tan \beta $ (b), where the gray area denotes $ \Delta a_\mu $ at $ 3.0\sigma $ given in Eq. (1).

      Through random scanning the parameter space shown in Table 1, we plot the anomalous magnetic dipole moment of muon $ a_\mu^{\rm{SUSY}} $ varying with the key parameters $ \tan \beta $ (a) and $ \upsilon_{\nu^c} $ (b) in Fig. 5, where the gray area denotes $ \Delta a_\mu $ at $ 3.0\sigma $ given in Eq. (1). Here, the red triangles are excluded by $ \Delta a_\mu $ at $ 3.0\sigma $. The green points of the $ \mu\nu $SSM agree with $ \Delta a_\mu $ at $ 3.0\sigma $, which can explain the current difference between the experimental measurements and the SM theoretical prediction for the muon anomalous MDM.

      Figure 5.  (color online) $ a_\mu^{\rm{SUSY}} $ versus $ \tan \beta $ (a) and $ \upsilon_{\nu^c} $ (b), where the gray area denotes $ \Delta a_\mu $ at $ 3.0\sigma $ given in Eq. (1) and the red triangles are eliminated.

      Figure 5(a) shows that the muon anomalous MDM $ a_\mu^{\rm{SUSY}} $ increases with an increase in the parameter $ \tan \beta $. One can find that a significant region of the parameter space is excluded by $ \Delta a_\mu $ at $ 3.0\sigma $ in the small $ \tan \beta $ region. Here, the very small $ \tan \beta $ region is also easily eliminated by the constraint of the 125 GeV Higgs boson mass. The numerical results in Fig. 5(b) depict that the muon anomalous MDM $ a_\mu^{\rm{SUSY}} $ is decoupling with increasing $ \upsilon_{\nu^{c}} $. Therefore, $ \upsilon_{\nu^{c}} $ can affect the masses of charginos and neutralinos. We can see that the value of the muon anomalous MDM $ a_\mu^{\rm{SUSY}} $ in the $ \mu\nu $SSM could explain the experimental muon anomalous MDM $ \Delta a_{\mu} $ at $ 3.0\sigma $ shown in Eq. (1), when $ \upsilon_{\nu^{c}} $ is small and $ \tan \beta $ is large. Constrained by $ \Delta a_{\mu} $ at $ 3.0\sigma $ shown in Eq. (1), $ \tan \beta<10 $ or $ \upsilon_{\nu^{c}}>5 $ TeV will be easily eliminated.

      To see more clearly, we plot the anomalous magnetic dipole moment of muon $ a_\mu^{\rm{SUSY}} $ varying with the lightest chargino mass $ m_{\chi_1} $ in Fig. 6(a), through scanning the parameter space shown in Table 1. The results show that the contribution of the lightest chargino mass $ m_{\chi_1} $ is roughly similar with the contribution of the parameter $ \upsilon_{\nu^c} $. Because here $ \mu \equiv 3\lambda\upsilon_{\nu^{c}} $, where μ directly affect the masses of the charginos. In Fig. 6(b), $ a_\mu^{\rm{SUSY}} $ versus $ m_{{{\tilde e}^c}} $ is also pictured. When $ m_{{{\tilde e}^c}} $ is small, $ a_\mu^{\rm{SUSY}} $ in the $ \mu\nu $SSM could explain the $ \Delta a_{\mu} $ at $ 3.0\sigma $. The variation trend of $ a_\mu^{\rm{SUSY}} $ versus $ m_{{{\tilde e}^c}} $ coincides with the decoupling theorem; therefore, $ m_{{{\tilde e}^c}} $ directly affects the masses of the slepton. One can see that the anomalous magnetic dipole moment of muon $ a_\mu^{\rm{SUSY}} $ can reach $ \Delta a_{\mu} $ at $ 3.0\sigma $ as shown in Eq. (1), when $ m_{\chi_1}<1.1 $ TeV and $ m_{{{\tilde e}^c}}<1.5 $ TeV.

      Figure 6.  (color online) $ a_\mu^{\rm{SUSY}} $ versus $ m_{\chi_1} $ (a) and $ m_{{{\tilde e}^c}} $ (b), where the gray area denotes $ \Delta a_\mu $ at $ 3.0\sigma $ given in Eq. (1) and the red triangles are eliminated.

      For the anomalous MDM of the electron and tau lepton, we also picture $ a_\mu^{\rm{SUSY}} $ versus $ a_e^{\rm{SUSY}} $ (a) and $ a_\tau^{\rm{SUSY}} $ (b) in Fig. 7, where the green points are in agreement with $ \Delta a_\mu $ at $ 3.0\sigma $ given in Eq. (1) and the red triangles are eliminated by that. Constrained by the updated discrepancy for $ \Delta a_\mu $ at $ 3.0\sigma $, the anomalous MDM $ a_e^{\rm{SUSY}} $ and $ a_\tau^{\rm{SUSY}} $ in the $ \mu\nu $SSM are about $ 0.7\times10^{-13} $ and $ 0.8\times10^{-6} $, respectively. The numerical results show that the ratio between the anomalous MDMs of the tau lepton and muon is about $ 2.8\times10^2 $, which is in agreement with $ {\bigtriangleup a_\tau}/{\bigtriangleup a_\mu}\simeq m_\tau^2/m_\mu^2\simeq2.8\times10^2 $. The ratio between the anomalous MDMs of the muon and electron also is consistent with $ {\bigtriangleup a_\mu}/{\bigtriangleup a_e}\simeq m_\mu^2/m_e^2\simeq4.3\times10^4 $.

      Figure 7.  (color online) $ a_\mu^{\rm{SUSY}} $ versus $ a_e^{\rm{SUSY}} $ (a) and $ a_\tau^{\rm{SUSY}} $ (b), where the gray area denotes $ \Delta a_\mu $ at $ 3.0\sigma $ given in Eq. (1), and the red triangles are eliminated by $ \Delta a_\mu $ at $ 3.0\sigma $.

    • B.   $\boldsymbol {h\rightarrow l_i \bar{l}_i}$

    • We define the physical quantity

      $ \delta_{l_i}\equiv {{\Gamma}_{\rm{NP}}(h\rightarrow {l_i}\bar{{l_i}})-{\Gamma}_{\rm{SM}}(h\rightarrow {l_i}\bar{{l_i}})\over {\Gamma}_{\rm{SM}}(h\rightarrow {l_i}\bar{{l_i}})}, $

      (34)

      to show the difference in the decay width of $ h\rightarrow {l_i}\bar{{l_i}} $ of the $ \mu\nu $SSM ($ {\Gamma}_{\rm{NP}}(h\rightarrow {l_i}\bar{{l_i}}) $) and that of the SM ($ {\Gamma}_{\rm{SM}}(h\rightarrow {l_i}\bar{{l_i}}) $), where $ {l_i}=e,\mu,\tau $. Firstly, to illustrate clearly the cross-correlation of the model parameters, we plot the ratio $ \delta_\mu $ (a) and $ \delta_\tau $ (b) versus the parameter $ \tan\beta $ with different $ \upsilon_{\nu^c} $ in Fig. 8, taking $ m_{{\tilde L}}=m_{{{\tilde e}^c}}=0.6 $ TeV, $ M_2=2 $ TeV, $ m_{{\tilde u}^c_3}=2 $ TeV and $ A_t=3 $ TeV for simplicity. In Fig. 8, the solid line denotes $ \upsilon_{\nu^c}=6 $ TeV, the dashed line denotes $ \upsilon_{\nu^c}=3 $ TeV, and the dotted line denotes $ \upsilon_{\nu^c}=1 $ TeV. The numerical results in Fig. 8 show that the ratios $ \delta_\mu $ and $ \delta_\tau $ increase with increasing $ \tan\beta $ or $ \upsilon_{\nu^{c}} $. The charged lepton Yukawa couplings obtain large $ \tan\beta $ enhancements, with $ {Y_{{e_i}}} = {{{m_{{l_i}}\sqrt{\tan^2\beta+1}}}}/{{{\upsilon}}} $.

      Figure 8.  (color online) Ratio $ \delta_\mu $ (a) and $ \delta_\tau $ (b) versus the parameter $ \tan\beta $ with different $ \upsilon_{\nu^c} $.

      Through scanning in Table 1, we plot Figs. 9, 10, where the green dots are the corresponding physical quantity values of the remaining parameters after being constrained by the muon anomalous MDM $ a_{\mu}^{\rm{SUSY}} $ in the $ \mu\nu $SSM, with $ 7.4\times 10^{-10} \leq a_{\mu}^{\rm{SUSY}} \leq 42.8\times 10^{-10} $considered a $ 3 \sigma $ experimental error. The red triangles are ruled out by the muon anomalous MDM with $ a_{\mu}^{\rm{SUSY}}> 42.8\times 10^{-10} $ and $ a_{\mu}^{\rm{SUSY}} < 7.4\times 10^{-10} $.

      Figure 9.  (color online) Ratio $ \delta_\mu $ versus the parameter $ \tan\beta $ (a) and $ \upsilon_{\nu^{c}} $ (b).

      Figure 10.  (color online) Ratio $ \delta_\tau $ versus the parameter $ \tan\beta $ (a) and $ \upsilon_{\nu^{c}} $ (b).

      In Fig. 9, we plot the ratio $ \delta_\mu $ varying with the parameter $ \tan\beta $ (a) and $ \upsilon_{\nu^{c}} $ (b). We can see that the ratio $ \delta_\mu $ increases with increasing $ \tan\beta $ in Fig. 9(a). The ratio $ \delta_\mu $ can be close to 30$ \% $ when the parameter $ \tan\beta $ is large, constrained by $ \Delta a_\mu $ at $ 3.0\sigma $. Fig. 9 (b) shows that the ratio $ \delta_\mu $ is non-decoupling with increasing $ \upsilon_{\nu^{c}} $. The maximum of the ratio $ \delta_\mu $ is around 15 $ \% $ as $ \upsilon_{\nu^c} $ is about 1 TeV and close to 30$ \% $ as $ \upsilon_{\nu^c} $ is about 3 TeV. In the $ \mu\nu $SSM, the parameter $ \upsilon_{\nu^{c}} $ leads to a mixing of the neutral components of the Higgs doublets with the sneutrinos. This mixing affects the lightest Higgs boson mass and the Higgs couplings, which is different in the SM.

      In addition, we plot the ratio $ \delta_\tau $ varying with the parameter $ \tan\beta $ and $ \upsilon_{\nu^{c}} $ in Fig. 10, which has a variation trend similar to that of the ratio $ \delta_\mu $. The numerical results show that, constrained by the experimental value of the muon anomalous MDM, the ratio $ \delta_\tau $ can be about $ 20\% $ when $ \tan \beta $ is about 40 and $ \upsilon_{\nu^c} $ is around 3 TeV.

    V.   SUMMARY
    • Considering that the new experimental average for the muon anomalous MDM increases the difference between the experiments and SM prediction to 4.2σ, we analyze the muon anomalous MDM at the two-loop level in the $ \mu\nu $SSM. The numerical results show that the $ \mu\nu $SSM can explain the current difference between the experimental measurements and the SM theoretical prediction for the muon anomalous MDM, constrained by the 125 GeV Higgs boson mass and decays, the rare decay $ \bar{B}\rightarrow X_s\gamma $ and so on. The new experimental average of the muon anomalous MDM considered that a $ 3 \sigma $ also gives a strict constraint for the parameter space of the $ \mu\nu $SSM, which constrains that $ \tan \beta>10 $, $ m_{{{\tilde e}^c}}<1.5 $ TeV and $ \upsilon_{\nu^{c}}<5 $ TeV with $ \lambda=0.1 $. Moreover, the anomalous MDM of the tau lepton and the electron in the $ \mu\nu $SSM can reach about $ 0.7\times10^{-13} $ and $ 0.8\times10^{-6} $, respectively, constrained by the new experimental average of the muon anomalous MDM at $ 3.0\sigma $.

      An upgrade to the Muon g-2 experiment at Fermilab and another experiment at the J-PARC [155] will lead to measurements of the muon anomalous magnetic dipole moment with higher precision, which may reach a 5σ deviation from the SM, constituting an augury for new physics beyond the SM. In addition, the anomalous MDM of the tau lepton and electron, whether deviating from the SM prediction, will be determined more accurately, with the development of experiments in the future.

      Considering that the ATLAS and CMS collaborations measured the 125 GeV Higgs boson decay into a pair of muons $ h\rightarrow \mu \bar{\mu} $ recently, we also investigate the 125 GeV Higgs boson decay $ h\rightarrow \mu \bar{\mu} $ at the one-loop level in the $ \mu\nu $SSM. Compared with the SM prediction, the decay width of $ h\rightarrow \mu \bar{\mu} $ and $ h\rightarrow \tau \bar{\tau} $ in the $ \mu\nu $SSM can boost up about 30% and 20%, considering the constraint from the muon anomalous magnetic dipole moment. In the $ \mu\nu $SSM, the mixing of the neutral components of the Higgs doublets with the sneutrinos affects the lightest Higgs boson mass and the Higgs couplings, which can contribute to Higgs boson decay. In the future, high luminosity or high energy large colliders [156159] will detect the Higgs boson decay $ h\rightarrow \mu \bar{\mu} $ and $ h\rightarrow \tau \bar{\tau} $ with high precision, which may be an indication for new physics.

Reference (159)

目录

/

DownLoad:  Full-Size Img  PowerPoint
Return
Return