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2024年10月30日

Chromomagnetic dipole moments of light quarks in the bestest little Higgs model

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T. Cisneros-Pérez, E. Cruz-Albaro, A. Y. Ojeda-Castañeda and S. E. Solís-Núñez. Chromomagnetic dipole moments of light quarks in the Bestest Little Higgs Model[J]. Chinese Physics C. doi: 10.1088/1674-1137/ad62d9
T. Cisneros-Pérez, E. Cruz-Albaro, A. Y. Ojeda-Castañeda and S. E. Solís-Núñez. Chromomagnetic dipole moments of light quarks in the Bestest Little Higgs Model[J]. Chinese Physics C.  doi: 10.1088/1674-1137/ad62d9 shu
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Chromomagnetic dipole moments of light quarks in the bestest little Higgs model

  • 1. Unidad Académica de Ciencias Químicas, Universidad Autónoma de Zacatecas,Apartado Postal C-585, 98060 Zacatecas, Mexico
  • 2. Facultad de Física, Universidad Autónoma de Zacatecas, Apartado Postal C-580, 98060 Zacatecas, Mexico

Abstract: In this study, we investigated the anomalous Chromomagnetic Dipole Moment (CMDM), denoted as $\hat{\mu}_{q}^{\rm BLHM}$, of light quarks $q=(u, c, d, s, b)$ within the framework of the Bestest Little Higgs Model (BLHM) as an extension of the Standard Model (SM). Our investigation encompassed novel interactions among the light quarks, heavy quark B, and heavy bosons $(W^{\prime\pm}, H^{\pm}, \phi^{\pm}, \eta^{\pm})$, incorporating the extended Cabibbo-Kobayashi-Maskawa (CKM) matrix characteristic of the BLHM. We thoroughly explored the permissible parameter space, yielding a spectrum of CMDM values ranging from $ 10^{-10} $ to $ 10^{-3} $ .

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    I.   INTRODUCTION
    • The CMDM of the top quark has been extensively studied theoretically within the framework of the SM [15], with the most accurate experimental measurement reported in [6]. Extended models in the literature have also explored both the CMDM and chromoelectric dipole moment (CEDM) [710], yielding results and theoretical implications that vary depending on each model beyond the SM (BSM). The prevalence of studies on the CMDM and CEDM of the top quark over the light quarks of the SM in BSM is precisely owing to the magnitude of its mass and the experimental framework in the last decade, in which interactions with heavy particles above 1 TeV were expected to be found. In this regard, we calculated the CMDMs of the light quarks and established new bounds on the parameters of the BLHM. Several experimental reports showed advances toward increasingly higher energies and hence hypothetical particles that may even exceed 5 TeV [11]. In this regard, the calculation of the CMDMs for light quarks $ (u,c,d,s,b) $ within the framework of certain BSM scenarios may seem unnecessary in the absence of experimental measurements. However, it is important to mention that a central value for $ \hat{\mu}_t^{\rm SM} $ already exists, and the CEDM is bounded. This uniquely contributes to the understanding of the the BLHM, complementing existing studies on the subject [10, 1214]. The CMDMs of the light quarks were calculated within the framework of the SM in [15] for spacelike value $ (q^2=-m_Z^2) $, while in [16], they were obtained for timelike value $ (q^2=+m^2_Z) $. In [17], the authors recalculated them for both values $ (q^2=\pm m^2_Z) $, providing detailed results for the individual contributions received by each light quark from the chromodynamic and electroweak parts. A large gluon momentum transfer, $ q^2 = -m^2_Z $, was used to avoid an infrared divergence in the triple gluon vertex contribution to the CMDM of the top quark [15] and because in perturbative QCD, the strong running coupling constant is found at conventional scale $\alpha_s(Q^2 = -q^2 = m^2_Z) = 0.1179$. Although $ \alpha_s $ is in the spacelike regime, its value is also used in strong interactions in the timelike domain, $ q^2>0 $ [18].

      In this study, we calculated the CMDM of light quarks $ (u,c,d,s,b) $ in the BLHM (it was shown in [19] that the CEDM does not exist in this model) for both values $ (q^2=\pm m^2_Z) $ of the off-shell gluon and with the on-shell quarks. In this case, we found differences in both scenarios, mainly for values greater than 2 TeV in the symmetry breaking scale of the model. The BLHM is a type-I Two Higgs Doublets Model (2HDM) that has not been explored as much as other models in the Little Higgs Model (LHM) family because it considers larger masses whose experimental observation was more difficult. However, for the latest CERN update, we expect results from models such as BLHM to stand out. Among other objectives, the BLHM was constructed [20] to address certain issues in the LHM family such as divergent singlets, masses of heavy bosons smaller than those of heavy quarks, and custodial symmetry [21]. A unique aspect of this model is its modular structure, which requires two distinct breaking scales, f and F, under condition $ F>f $. Thus, the heavy quarks depend on scale f, whereas the heavy gauge bosons depend on both f and F, where F can be as large as necessary. The BLHM also offers a highly enriched phenomenology owing to its fermionic and bosonic contents, whose contributions to the light quarks may provide interesting insight for signals of new physics in the leading medium-term planned experiments.

      The rest of this paper is organized as follows. In Sec. II, we provide a brief introduction to the BLHM. In Sec. III, we discuss the effective Lagrangian containing the magnetic dipole moment form factor. In Sec. IV, we describe the parameter space of the BLHM and the experimental limits that constrain it. In Sec. V, we develop the phenomenology of the CMDM of light quarks and present our results. Finally, in Sec. VI, we provide our conclusions. Appendix A details the new Feynman rules used.

    II.   A BRIEF REVIEW OF THE BLHM
    • The BLHM [20] comes from group $S O(6)_A \times S O(6)_B$, which experiences a breaking at scale f toward $S O(6)_V$ when non-linear sigma field $ \Sigma $ acquires a vacuum expectation value (VEV), $ \langle\Sigma\rangle = 1 $,

      $ \Sigma={\rm e}^{{\rm i}\Pi/f}{\rm e}^{2{\rm i}\Pi_h/f}{\rm e}^{{\rm i}\Pi/f}. $

      (1)

      This results in 15 pseudo-Nambu Goldstone bosons, parameterized through electroweak triplet $ \phi^a $ with zero hypercharges $ (a=1,2,3) $ and triplet $ \eta^a $, where $ (\eta_1,\eta_2) $ forms a complex singlet with hypercharge, and $ \eta_3 $ becomes a real singlet. Scalar field $ \sigma $ is required to generate a collective quartic coupling [20], and $ T_{L,R}^a $ denotes the generators of the $S U(2)_L$ and $S U(2)_R$ groups. Thus, we have

      $ \Pi=\begin{pmatrix} \phi_a T^a_L+\eta_aT^a_R & 0 & 0\\ 0 & 0 & i\sigma/\sqrt{2}\\ 0 & -{\rm i} \sigma/\sqrt{2} & 0 \end{pmatrix}. $

      (2)

      In matrix $ \Pi_h $, $ h_i^T=(h_{i1},h_{i2},h_{i3},h_{i4}) $, $ (i=1,2) $, represent the Higgs quadruplets of $S O(4)$,

      $ \Pi_h=\begin{pmatrix} 0_{4\times4} & h_1 & h_2\\ -h^T_1 & 0 & 0\\ -h^T_2 & 0 & 0 \end{pmatrix}. $

      (3)
    • A.   Scalar sector

    • In the context of the BLHM, two operators are necessary to induce the quartic coupling of the Higgs via collective symmetry breaking; none of these operators alone enables the Higgs to develop a potential:

      $ \begin{aligned}[b] &P_5= {\rm diag} (0,0,0,0,1,0),\\ &P_6= {\rm diag} (0,0,0,0,0,1). \end{aligned} $

      (4)

      Thus, we can express the quartic potential as [20]

      $ \begin{aligned}[b] V_q=\;&\frac{1}{4}\lambda_{65}f^4Tr(P_6\Sigma P_5\Sigma^T)\\ &+\frac{1}{4}\lambda_{56}f^4Tr(P_5\Sigma P_6 \Sigma^T)\\ =\;&\frac{1}{4}\lambda_{65}f^4(\Sigma_{65})^2+\frac{1}{4}\lambda_{56}f^4(\Sigma_{56})^2, \end{aligned} $

      (5)

      where $ \lambda_{56} $ and $ \lambda_{65} $ are the non-zero coefficients necessary to realize collective symmetry breaking and produce a quartic coupling for the Higgs.

      The initial segment of Eq. (5) induces a breaking of $S O(6)_A \times S O(6)_B$ to $S O(5)_{A5} \times S O(5)_{B6}$, whereby $S O(5)_{A5}$ prohibits $ h_1 $ from acquiring a potential, and $S O(5)_{B6}$ performs the same function for $ h_2 $. The latter portion of Eq. (5) leads to a breaking of $S O(6)_A \times S O(6)_B$ to $S O(5)_{A6} \times S O(5)_{B5}$. If we expand Eq. (1) in powers of $ 1/f $ and substitute it into Eq. (5), we obtain

      $ \begin{aligned}[b] V_q=\; &\frac{\lambda_{65}}{2}\left(f\sigma-\frac{1}{\sqrt{2}}h_1^Th_2+\dots\right)^2\\ &+\frac{\lambda_{56}}{2}\left(f\sigma+\frac{1}{\sqrt{2}}h_1^Th_2+\dots\right)^2. \end{aligned} $

      (6)

      This potential generates a mass for $ \sigma $,

      $ \begin{equation} m_{\sigma}^2=(\lambda_{65}+\lambda_{56})f^2. \end{equation} $

      (7)

      According to Eq. (6), it seems that each term individually contributes to the generation of a quartic coupling for the Higgs fields. However, this effect can be nullified by redefining field $ \sigma $ as $ \pm \dfrac{h^{T}_1 h_2}{\sqrt{2} f} $, where the positive and negative signs correspond to the first and second operators in Eq. (6), respectively. In combination, however, the two expressions in Eq. (6) yield a quartic Higgs potential at a tree level; this occurs after integrating $ \sigma $ [2022]:

      $ \begin{equation} V_q=\frac{\lambda_{56} \lambda_{65}}{\lambda_{56}+ \lambda_{65}} \left(h_1^Th_2 \right)^2= \frac{1}{2}\lambda_{0}\left(h_1^Th_2 \right)^2. \end{equation} $

      (8)

      The expression obtained has the desired form of a collective quartic potential [20, 21]. Thus, we derive a quartic collective potential form that is dependent on two distinct couplings [20]. Note that $ \lambda_0 $ will be zero whenever $ \lambda_{56} $ and/or $ \lambda_{65} $ are zero. This exemplifies the concept of collective symmetry breaking.

      Excluding gauge interactions, not all scalars acquire mass. Consequently, it becomes necessary to introduce the potential,

      $ \begin{aligned}[b] V_s=&-\frac{f^2}{4}m_4^2Tr\left(\Delta^{\dagger}M_{26}\Sigma M^{\dagger}_{26}+\Delta M_{26}\Sigma^{\dagger}M^{\dagger}_{26}\right)\\ &-\frac{f^2}{4}\left(m_5^2\Sigma_{55}+m_6^2\Sigma_{66}\right), \end{aligned} $

      (9)

      where $ m_4 $, $ m_5 $, and $ m_6 $ represent mass parameters, and $ (\Sigma_{55},\Sigma_{66}) $ denote the matrix elements from Eq. (1). In this context, $ M_{26} $ is a matrix that contracts the $S U(2)$ indices of $ \Delta $ with the $S O(6)$ indices of $ \Sigma $,

      $ \begin{equation} M_{26}=\frac{1}{\sqrt{2}} \begin{pmatrix} 0 & 0 & 1 & {\rm i} & 0 & 0\\ 1 & -{\rm i} & 0 & 0 & 0 & 0 \end{pmatrix}. \end{equation} $

      (10)

      Operator $ \Delta $ originates from a global symmetry $S U(2)_C \times S U(2)_D$, which is spontaneously broken to diagonal $S U(2)$ at scale $ F>f $ upon acquiring a VEV, $ \langle\Delta\rangle = 1 $. We can parameterize it in the following form:

      $ \begin{equation}\Delta={\rm e}^{2{\rm i}\Pi_d/F}, \quad \Pi_d=\chi_a\frac{\tau_a}{2} \quad (a=1,2,3),\end{equation} $

      (11)

      where matrix $ \Pi_d $ incorporates the scalars of triplet $ \chi_a $, which undergo mixing with triplet $ \phi_a $;$ \tau_a $ denotes the Pauli matrices. $ \Delta $ is linked to $ \Sigma $ in a manner such that the diagonal subgroup of $S U(2)_A \times S U(2)_B \subset S O(6)_A \times S O(6)_B$ is recognized as the SM $S U(2)_L$ group. If we expand operator $ \Delta $ in the powers of $ 1/F $ and substitute it in Eq. (9), we obtain

      $ \begin{equation} V_s=\frac{1}{2}\left(m^2_{\phi}\phi^2_a+m^2_{\eta}\eta^2_a+m^2_1h^T_1h_1+m^2_2h^T_2h_2\right), \end{equation} $

      (12)

      where

      $ m^2_{\phi}=m^2_{\eta}=m^2_4,\quad m^2_1=\frac{1}{2}(m^2_4+m^2_5),\quad m^2_2=\frac{1}{2}(m^2_4+m^2_6). $

      (13)

      To trigger EWSB, the next potential term is introduced [20]:

      $ \begin{equation} V_{B_{\mu}}=m_{56}^2f^2\Sigma_{56}+m_{65}^2f^2\Sigma_{65}, \end{equation} $

      (14)

      where $ m_{56} $ and $ m_{65} $ are the mass terms that correspond to matrix elements $ \Sigma_{56} $ and $ \Sigma_{65} $, respectively. Finally, we have the complete scalar potential,

      $ \begin{equation} V=V_q+V_s+V_{B_{\mu}}. \end{equation} $

      (15)

      A potential for the Higgs doublets is necessary; hence, we minimize Eq. (15) with respect to $ \sigma $ and then substitute the resulting expression back in Eq. (15), yielding the following expression:

      $ \begin{aligned}[b] V_H=\frac{1}{2}\Big[m_1^2h_1^Th_1+m_2^2h_2^Th_2-2B_{\mu}h_1^Th_2 +\lambda_0(h_1^Th_2)^2\Big], \end{aligned} $

      (16)

      where

      $ \begin{equation} B_{\mu}=2\frac{\lambda_{56}m_{65}^2+\lambda_{65}m_{56}^2}{\lambda_{56}+\lambda_{65}}. \end{equation} $

      (17)

      The potential given by Eq. (16) reaches a minimum when $ m_1m_2 > 0 $, and EWSB necessitates that $ B_{\mu} > m_1m_2 $. Note that term $ B_{\mu} $ vanishes if either $ \lambda_{56}=0 $, $ \lambda_{65}=0 $, or both are zero in Eq. (17). Following EWSB, the Higgs doublets acquire VEVs given by

      $ \begin{equation} \langle h_1\rangle=v_1, \quad \langle h_2\rangle=v_2. \end{equation} $

      (18)

      The two terms in Eq. (18) are required to minimize Eq. (16), leading to the following relationships:

      $ v_1^2=\frac{1}{\lambda_0}\frac{m_2}{m_1}(B_{\mu}-m_1m_2), $

      (19)

      $ v_2^2=\frac{1}{\lambda_0}\frac{m_1}{m_2}(B_{\mu}-m_1m_2), $

      (20)

      where the $ \beta $ angle between $ v_1 $ and $ v_2 $ [20] fulfills the expression

      $ \begin{equation} \tan\beta=\frac{\langle h_{11}\rangle}{\langle h_{21}\rangle}=\frac{v_1}{v_2}=\frac{m_2}{m_1}, \end{equation} $

      (21)

      and we thus have that

      $ \begin{aligned}[b] v^2=\;&v_1^2+v_2^2=\frac{1}{\lambda_0}\left(\frac{m_1^2+m_2^2}{m_1m_2}\right)(B_{\mu}-m_1m_2) \simeq(246\;{\rm GeV})^2. \end{aligned} $

      (22)

      Following EWSB, the scalar sector [20, 22] gives rise to massive states such as $ h^0 $ (the SM Higgs), $ A^0 $, $ H^{\pm} $, and $ H^0 $, each having their respective masses:

      $ \begin{aligned} &&m^2_{G^0}=m^2_{G^{\pm}}=0, \end{aligned} $

      (23)

      $ \begin{aligned} &&m^2_{A^0}=m^2_{H^{\pm}}=m^2_1+m^2_2, \end{aligned} $

      (24)

      $ \begin{aligned}[b]m^2_{h^0,H^0}= \;&\frac{B_{\mu}}{\sin2\beta}\\ & \mp\sqrt{\frac{B^2_{\mu}}{\sin^22\beta}-2\lambda_0\beta_{\mu} v^2\sin2\beta+\lambda_0^2v^4\sin^22\beta}, \end{aligned} $

      (25)

      where $ G^0 $ and $ G^{\pm} $ represent the Goldstone bosons that are absorbed to confer masses to the $ W^{\pm} $ and Z bosons of the SM.

    • B.   Gauge boson sector

    • The Lagrangian including the gauge kinetic terms is given by [20, 22]

      $ \begin{equation} \mathcal{L}=\frac{f^2}{8}Tr\left(D_{\mu}\Sigma^{\dagger}D^{\mu}\Sigma\right)+\frac{F^2}{4}Tr\left(D_{\mu}\Delta^{\dagger}D^{\mu}\Delta\right), \end{equation} $

      (26)

      where $ D_{\mu}\Sigma $ and $ D_{\mu}\Delta $ are the covariant derivatives,

      $ \begin{aligned}[b] D_{\mu}\Sigma=\;&{\rm i}\sum_a\left(g_AA_{1\mu}^aT_L^a\Sigma-g_BA_{2\mu}^a\Sigma T^a_L\right)\\ &+ {\rm i} g'B_3\left(T^3_R\Sigma-\Sigma T^3_R\right),\end{aligned} $

      (27)

      $ D_{\mu}\Delta=\frac{\rm i}{2}\sum_a\left(g_AA^a_{1\mu}\tau_a\Delta-g_BA^a_{2\mu}\Delta\tau_a\right), $

      (28)

      where $ (A^a_{1\mu},A^a_{2\mu}) $ represent the eigenstates of the gauge bosons, g' is the coupling constant of $ U(1)_Y $, and g is the coupling constant of $S U(2)_L$. These terms are related to couplings $ g_A $ and $ g_B $ of $S U(2)_A \times S U(2)_B$ as follows:

      $ \begin{aligned} g=\frac{g_Ag_B}{\sqrt{g_A^2+g_B^2}}, \end{aligned} $

      (29)

      $ \begin{aligned} s_g=\sin\theta_g=\frac{g_A}{\sqrt{g_A^2+g_B^2}}, \end{aligned} $

      (30)

      $ \begin{aligned} c_g=\cos\theta_g=\frac{g_B}{\sqrt{g_A^2+g_B^2}}, \end{aligned} $

      (31)

      where $ \theta_g $ is the mixing angle; if $ g_A = g_B $, then $ \tan\theta_g = 1 $.

      In the context of the BLHM, the masses of both heavy gauge bosons $ W^{\prime\pm} $, $ Z' $, and those of the SM bosons are also generated from [20, 22]

      $ \begin{aligned}[b] m_{Z'}^2=\;&\frac{1}{4}(g_A^2+g_B^2)(f^2+F^2)-\frac{1}{4}g^2v^2\\ &+\Bigg(2g^2+\frac{3f^2}{f^2+F^2}\times(g^2+g'^2)(s_g^2-c_g^2)\Bigg)\frac{v^4}{48f^2}, \end{aligned} $

      (32)

      $ m_{W'}^2=\frac{1}{4}(g_A^2+g_B^2)(f^2+F^2)-m_W^2. $

      (33)
    • C.   Fermion sector

    • The Lagrangian that governs the fermion sector of the BLHM is given by [20]

      $ \begin{aligned}[b] \mathcal{L}_t=\;&y_1fQ^TS\,\Sigma\, SU^c+y_2fQ_a^{\prime T}\Sigma\,U^c\\ &+y_3fQ^T\Sigma\, U_5^{\prime c}+y_bfq_3^T(-2{\rm i} T_ R^3\Sigma)U_b^c+ {\rm{h.c.}}, \end{aligned} $

      (34)

      where $ (Q,Q') $ and $ (U,U') $ are the multiplets of $S O(6)_A$ and $S O(6)_B$, respectively, defined by

      $ \begin{aligned}[b] Q^T=\;&\frac{1}{\sqrt{2}}\Big[-(Q_{a1}+Q_{b2}),{\rm i}(Q_{a1}-Q_{b2}),\\ &(Q_{a2}-Q_{b1}),{\rm i}(Q_{a2}+Q_{b1}),Q_{5},Q_6\Big], \end{aligned} $

      (35)

      where $ (Q_{a1},Q_{a2}) $ and $ (Q_{b1},Q_{b2}) $ represent the $ S U(2)_L $ doublets, and $ (Q_5,Q_6) $ are the singlets under $S U(2)_L \times S U(2)_R = S O(4)$. Meanwhile,

      $ \begin{aligned}[b] (U^c)^T=\;&\frac{1}{\sqrt{2}}\Big[-(U^c_{b1}+U^c_{a2}),{\rm i}(U^c_{b1}-U^c_{a2}),\\ &(U^c_{b2}-U^c_{a1}),{\rm i}(U^c_{b2}+U^c_{a1}),U^c_5,U^c_6\Big], \end{aligned} $

      (36)

      where $ (U^c_{a2},-U^c_{a1}) $ and $ (-U^c_{b2},U^c_{b1}) $ represent the doublets of $S U(2)_L$ along with singlets $ (U_5,U_6) $. In addition,

      $ \begin{aligned} Q'^{ T}_{a}=\frac{1}{\sqrt{2}}\left(-Q'_{a1},{\rm i}Q'_{a1},Q'_{a2},iQ'_{a2},0,0\right) \end{aligned} $

      (37)

      $ U^{\prime c T}_5=(0,0,0,0,U^{\prime c}_5,0), $

      (38)

      are a doublet of $S U(2)_A$ and singlet of $S U(2)_{A,B}$, respectively. $ S=\text{diag}(1,1,1,1,-1,-1) $ represents a symmetry operator, $ (y_1,y_2,y_3) $ denote the Yukawa couplings, and term $ (q_3,U_b^c) $ in Eq. (34) encodes information regarding the bottom quark. The BLHM introduces novel physics into the gauge, fermion, and Higgs sectors, leading to the presence of partner particles for the majority of SM particles. Given that top quark loops contribute significantly to the divergent quantum corrections of the Higgs mass in the SM, the new heavy quarks introduced in the BLHM framework are expected to play a pivotal role in addressing the hierarchy problem. The heavy quarks include T, $ T^5 $, $ T^6 $, $ T^{2/3} $, $ T^{5/3} $, and B, each having the following assigned masses [20]:

      $ m_{T}^2=(y_1^2+y_2^2)f^2+\frac{9v_1^2y_1^2y_2^2y_3^2}{(y_1^2+y_2^2)(y_2^2-y_3^2)}, $

      (39)

      $ m_{T^{5}}^2=(y_1^2+y_3^2)f^2 -\frac{9v_1^2y_1^2y_2^2y_3^2}{(y_1^2+y_3^2)(y_2^2-y_3^2)}, $

      (40)

      $ \begin{aligned} m_{T^{6}}^2&=&m_{T^{2/3}}^2=m_{T^{5/3}}^2=y_1^2f^2, \end{aligned} $

      (41)

      $ \begin{aligned} m_{B}^2&=&y_B^2f^2=(y_1^2+y_2^2)f^2. \end{aligned} $

      (42)

      In the Lagrangian of the quark sector [20], the Yukawa couplings are constrained to $ 0<y_i<1 $. Additionally, the masses of the top (t) and bottom (b) quarks are generated by Yukawa couplings $ y_t $ and $ y_b $ [22] as follows:

      $ \begin{aligned} m^2_t&=&y_t^2v_1^2, \end{aligned} $

      (43)

      $ \begin{aligned} m^2_b&=&y_b^2v_1^2-\frac{2y^2_b}{3\sin^2\beta}\frac{v^4_1}{f^2}. \end{aligned} $

      (44)

      Coupling $ y_t $, given by

      $ \begin{equation} y_t^2=\frac{9y_1^2y_2^2y_3^2}{(y_1^2+y_2^2)(y_1^2+y_3^2)}, \end{equation} $

      (45)

      is a part of the measure of fine-tuning in the BLHM [22], defined as

      $ \begin{equation} \Psi=\frac{27f^2}{8\pi^2v^2\lambda_0\cos^2\beta}\frac{|y_1|^2|y_2|^2|y_3|^2}{|y_2|^2-|y_3|^2}\log\frac{|y_1|^2+|y_2|^2}{|y_1|^2+|y_3|^2}. \end{equation} $

      (46)

      In this study, we implemented a parameter space in which angle $ \beta $ assumes the role of most important free parameter. Given that Eq. (46) also depends on $ \beta $, it is essential to keep its values bounded, that is,$ \Psi \leqslant 2 $, to avoid model fine-tuning [20].

    • D.   Flavor mixing in the BLHM

    • In the original development of the BLHM [20], the authors did not include interactions between heavy quarks $ (T, T^5, T^6, T^{2/3}, T^{5/3}, B) $ and light quarks of the SM $ (u, c, d, s) $. This omission prevents the calculation of observables such as the one proposed in this study. Therefore, we implemented the extension to the BLHM introduced in [19]. This extension allowed us to obtain interactions and contributions from heavy quarks to the chromodipole moments of light quarks. The best approach to perform this is by adding terms

      $ \begin{equation} y_Bfq_1(-2{\rm i}T_R^2\Sigma)d_B^c, \quad y_Bfq_2(-2{\rm i}T_R^2\Sigma)d_B^c, \end{equation} $

      (47)

      to the Lagrangian expressed by Eq. (34). Here, $ y_B^2=y_1^2+ y_2^2 $ is the Yukawa coupling of the heavy B quark, $ q_1 $ and $ q_2 $ are the multiplets of the light SM quarks, and $ d_B^c $ is a new multiplet containing the heavy B quark. This modification leads to the interactions among scalar fields $ (H^{\pm},\phi^{\pm},\eta^{\pm}) $, heavy quark B, and light SM quarks $ (u, c, d, s) $. The vectorial interactions among fields $ (W^{\pm},W'^{\pm}) $, heavy quark B, and light SM quarks are allowed by adding the following terms to the Lagrangian that describes the fermion-gauge interactions [20, 22]:

      $ \begin{equation} \sum\limits_{i=1}^2{\rm i}\bar{\sigma}_{\mu}Q^{\dagger}_3D^{\mu}q_i, \quad \sum\limits_{i=1}^4{\rm i}\bar{\sigma}_{\mu}q_i^{\prime\dagger}D^{\mu}U^c, \end{equation} $

      (48)

      where $ \bar{\sigma}_{\mu}=-\sigma_{\mu} $ are the Pauli matrices, $ Q_3^T= (1/\sqrt{2}) (0,0,B,{\rm i}B,0,0) $, and $ q_i^{\prime T}=(0,0,0,0,q_i^c,0) $ with $ i=1,2 $. Covariant derivative $ D_{\mu} $ contains information about $ (W^{\pm},W^{\prime\pm}) $. With these changes, we can introduce two extended matrices of the Cabibbo-Kobayashi-Maskawa (CKM) type [23], $ V_{Hu} $ and $ V_{Hd} $, such that $ V_{\rm CKM}=V_{Hu}^{\dagger}V_{Hd} $, where $ V_{\rm CKM} $ is the CKM matrix of the SM. Regarding the interactions of light quarks with the neutral heavy bosons $ (h^0,H^0,A^0,\phi^0,\eta^0,\sigma,Z,Z',\gamma) $and quark B, they are also included in Eqs. (47) and (48).

    III.   THE CMDM IN THE BLHM
    • The effective Lagrangian describing the contributions of vertex $ g\bar{q}_iq_i $, where $ q_i={u,c,d,s} $, is expressed as

      $ \begin{equation} \mathcal{L}_{\rm eff}=-\frac{1}{2}\bar{q}_iT_a\sigma^{\mu\nu}\left(\hat{\mu}_{q_i}+{\rm i}\hat{d}_{q_i}\gamma^5\right)q_iG^a_{\mu\nu}, \end{equation} $

      (49)

      where $ G^a_{\mu\nu} $ represents the gluon field strength tensor, $ T_a $ denotes the colour generators of $ S U(3)_C $, $ \hat{\mu}_{q_i} $denotes the CMDM, and $ \hat{d}_{q_i} $ represents the CEDM, such that

      $ \begin{equation} \hat{\mu}_{q_i}=\frac{m_{q_i}}{g_s}\mu_{q_i}, \quad \hat{d}_{q_i}=\frac{m_{q_i}}{g_s}d_{q_i}. \end{equation} $

      (50)

      The definitions provided by Eq. (50) are the standard relations for the CMDM and CEDM commonly found in the literature, given that $ \mathcal{L}_{\text{eff}} $ has dimension 5. Here, $ m_{q_i} $ denotes the mass of each light quark and $ g_s=\sqrt{4\pi \alpha_s} $ represents the coupling constant of the group. In our scenario, we solely need to evaluate chromomagnetic form factor $ \mu_{q_i} $ originating from one-loop contributions of scalar fields $ A^0, H^0, H^{\pm}, h^0, \sigma, \phi^0, \phi^{\pm},\eta^0, \eta^{\pm} $, vector fields $ Z^0, Z', W^{\pm}, W'^{\pm} $, and heavy quarks $ T, T^5, T^6, T^{2/3},T^{5/3}, B $. Concerning the CEDM, it was demonstrated [5] to be identically zero within the BLHM framework, thus necessitating no further consideration in this study.

    IV.   PARAMETER SPACE OF THE BLHM
    • Two types of parameter spaces have been utilized in the different studies on the BLHM. The initial studies on the model [22, 2426] parameterized Yukawa couplings $ (y_1, y_2, y_3) $ in terms of two angles $ (\theta_{12}, \theta_{13}) $ that divide the space into two parts, leading to heavy quark masses that acquire two hierarchies depending on whether $ y_2 < y_3 $ or $ y_3 < y_2 $. By contrast, the parameter space employed in this study is the same as that proposed in [5, 19, 27]. It can be optimized more easily without dividing it into two parts or inducing hierarchies in the masses of heavy quarks. In this implementation, the Yukawa couplings of the BLHM are maintained in the range $ 0<y_i<1 $, ensuring that the relation given by Eq. (45) is satisfied under the condition given by Eq. (43) and value $ m_t=172.13 $ GeV [28]. We solved Eq. (25) to deduce the masses of the scalar bosons in the model considering $ 0.15\leqslant\beta\leqslant1.49 $ radians and $ m_{h^0}=125.46 $ GeV [29] under condition $ \lambda^0<4\pi $ [26]. The authors of the BLHM imposed condition $ \tan\beta>1 $, thereby ensuring that the contributions from radiative corrections at one-loop from the top quark and heavy tops to the Higgs mass are minimized. This narrows down the interval for $ \beta $ to $ 0.79<\beta<1.49 $ radians. According to the constraints deduced in [27] to maintain fine-tuning $ \Psi $(Eq. (46)) within interval $ 0<\Psi<2 $, we also adopted the same values for all parameters of the BLHM, as shown in Table 1. This table is divided into minima and maxima according to the different intervals of breaking scale f; note the allowed masses for scalar fields $ A^0 $, $ H^0 $, and $ H^{\pm} $. Parameter $ \alpha $ is the mixing angle between fields $ h^0 $ and $ H^0 $ [22], such that the alignment limit is satisfied, $ \cos(\beta-\alpha)\approx0 $ [30]. The mass of scalar boson $ \sigma $ is the largest among those of the scalars of the BLHM and is given as $m_{\sigma}^2= 2\lambda^0K_{\sigma}f^2$ [26], which is equivalent to Eq. (7) but more easy to calculate. For scalar $ \eta^0=m_4 $, where $ m_4 $ is a free parameter of the model [20], we set the $ 30 \leqslant m_4 \leqslant 800 $ GeV range[19] owing to the growing magnitudes of masses for experimentally sought new particles. In the case of charged scalar bosons $ \phi^{\pm} $, $ \eta^{\pm} $ and neutral $ \phi^0 $, their masses also depend on $ m_4 $ as well as both breaking scales, f and F, and one-loop contributions from the Coleman-Weinberg potential [20, 24]. Note that $ 1\leqslant f\leqslant3 $ TeV and $ F=5 $ TeV in Table 2.

      Parameter$ f(1\,{ \text{TeV}}) $$ f(2\,{ \text{TeV}}) $$ f(3\,{ \text{TeV}}) $
      MinMaxMinMaxMinMaxUnit
      $ \beta $0.791.470.791.360.791.24rad
      $ \alpha $−0.990.00−0.99−0.16−0.99−0.31rad
      $ \Psi $0.0962.110.382.030.872.04
      $ m_{A^0} $125.0884.86125.0322.75125.0207.07GeV
      $ m_{H^0} $872.041236.06872.04921.42872.04887.53GeV
      $ m_{H^{\pm}} $125.0884.86125.0322.75125.0207.07GeV

      Table 1.  Parameters and scalar masses constrained in the BLHM.

      Mass Values
      $ f(1\,{ \text{TeV}}) $ $ f(3\,{ \text{TeV}}) $ Unit
      $ m_{\sigma} $ 1414.2 4242.6 GeV
      $ m_{\phi^0} $ 836.1 999.3 GeV
      $ m_{\phi^{\pm}} $ 841.9 1031.9 GeV
      $ m_{\eta^{\pm}} $ 580.0 1013.9 GeV

      Table 2.  Scalar masses of the BLHM.

      The masses of heavy vector bosons $ (W^{\prime\pm},Z') $ depend on scales f and $ F=5 $ TeV. To determine their masses, we used Eqs. (32) and (33). The results are shown in Table 3.

      Mass Values
      $ f(1\,{ \text{TeV}}) $ $ f(3\,{ \text{TeV}}) $ Unit
      $ m_{W^{\prime\pm}} $ 3328.63 3806.44 GeV
      $ m_{Z'} $ 3327.65 3805.58 GeV

      Table 3.  Vector masses of the BLHM.

      The masses of the six heavy quarks introduced in this model are given by Eqs. (39)−(42), in which we do not observe a dependence on angle $ \beta $ but only on Yukawa couplings $ (y_1,y_2,y_3) $and breaking scale f. This allows for simpler calculation of these masses in the $ 1<f<3 $ TeV interval; their values are shown in Table 4.

      Mass $ 1\leqslant f\leqslant 3 $ TeV
      Min Max Unit
      $ m_{T} $ 1140.18 3420.53 GeV
      $ m_{T^5} $ 773.88 2321.66 GeV
      $ m_{T^6} $ 780.0 2100.0 GeV
      $ m_{T^{2/3}} $ 780.0 2100.0 GeV
      $ m_{T^{5/3}} $ 780.0 2100.0 GeV
      $ m_{B} $ 1140.18 3420.53 GeV

      Table 4.  Quark masses of the BLHM.

    • A.   Experimental limits for the BLHM

    • Experimentally, the pursuit of a heavy neutral scalar, such as $ A^0 $ and $ H^0 $, is in line with the mass range of the BLHM. In [31], masses in the range of $ 230-800 $ GeV for $ m_{A^0} $ and $ 130-700 $ GeV for $ m_{H^0} $ were explored in decay $ A\to ZH $, based on an integrated luminosity of $ 139 $ fb$ ^{-1} $ from pp collisions at $ \sqrt{s} = 13 $ TeV recorded by the ATLAS detector and interpreted within the 2HDM framework. A study based on ATLAS data [32] analyzed process $ A\to Zh $ excluding masses of $ A^0 $ below 1 TeV at 95% C.L. for all types of 2HDM. Similarly, in [33], based on CMS data, masses of $ A^0 $ below 1 TeV were also ruled out. In [34], type-I 2HDMs were investigated through the simulation of process $ e^{-} e^{+} \to AH $ using the SiD detector at the ILC, with an integrated luminosity of 500 fb$ ^{-1} $. This resulted in ranges of $ 200 < m_{A^0} < 250 $ GeV and $ 150 < m_{H^0} < 250 $ GeV. For $ H^{\pm} $, a study [35] examined process $H^{\pm}\to HW^{\pm}$ at CMS in pp collisions at $ \sqrt{s} = 13 $ TeV with an integrated luminosity of $ 138 $ fb$ ^{-1} $, considering $ m_{H^{\pm}} $ in the range of $ 300-700 $ GeV. Additionally, in [6], decay $ H^{+}\to t\bar{b} $ was explored in pp collisions at $ \sqrt{s}=13 $ TeV using 139 fb$ ^{-1} $of data from ATLAS, with $ m_{H^{+}} $considered in the range of $ 200-2000 $ GeV. The exploration for heavy Higgs bosons seems to be highly active in various channels and theoretical frameworks, such as 2HDM. Furthermore, all the mass ranges either encompass or are encompassed by those investigated in this study.

      The presence of neutral and charged fields, denoted by $ (\phi, \eta) $, derived from pseudo Goldstone bosons, is a common feature shared with other LHM frameworks and proposals for dark matter. However, experimental searches primarily focus on fields associated with the Higgs rather than scalars of this nature [3638]. Another distinctive characteristic of the BLHM is real scalar field $ \sigma $, which is anticipated to be the heaviest among the scalars. Nevertheless, its contribution to the CMDM of light SM quarks is nearly negligible owing to certain constraints imposed by the CKM extended matrix. Within the domain of heavy quarks, decay channels $ T\to Ht $ or $ T\to Zt $ were examined in [39]. This study analyzed proton-proton collisions at $ \sqrt{s}=13 $ TeV with an integrated luminosity of 139 fb$ ^{-1} $ at ATLAS, revealing no significant signals at the 95% confidence level for the mass of T in the range of $ 1.6-2.3 $ TeV. Similar searches for T and B were reported in [4042]. In [40], the authors also explored the potential decay of quarks with charge $ 5/3 $, such as $ T^{5/3} $, to $ Wt $, establishing a lower limit for $ m_{T^{5/3}} $ of $ 1.42 $ TeV. For the BLHM within our parameter space, we found that $ m_{T^{5/3}}=m_{T^6}=m_{T^{2/3}} $ span the range of $ 780-2100 $ GeV, as shown in Table 4. In the BLHM, we introduced additional vector bosons $ W^{\prime\pm} $ and $ Z' $, whose masses were constrained to be equal based on the properties chosen for our parameter space. Several investigations on the existence of the $ W' $ boson have been reported. In [43], various mass ranges for $ m_{W'} $ were considered within the theoretical framework of different extended models, with values ranging from $ 2.2 $ to $ 4.8 $TeV. Regarding the $ Z' $ boson, recent searches indicate that its mass exceeds $ 4.7 $ TeV [44] and is within the range of $ 800- 3700 $ GeV [45].

    V.   PHENOMENOLOGY OF THE CMDM OF THE LIGHT QUARKS
    • Regarding the CMDM, the permissible one-loop diagrams involving scalar and vector contributions are shown in Fig. 1. The amplitudes associated with the dipole diagrams for each of the $ (u, c, d, s, b) $ quarks are as follows:

      Figure 1.  Left: interactions of SM light quarks $ (u,c,d,s,b) $ and BLHM heavy quarks $ Q=(T,T^5,T^6,T^{2/3},T^{5/3},B) $ with scalar fields $ S_i $: $ A^0, H^0, h^0, H^{\pm}, \phi^0, \eta^0, \sigma, \phi^{\pm}, \eta^{\pm} $. Right: interactions of the same quarks with vector fields $ V_i $: $ Z^0, W^{\pm}, \gamma, Z', W^{\prime\pm} $.

      $ \begin{aligned}[b] \mathcal{M}^{\mu}_{q_n}(S)=\;&\sum_{i,j}\int\frac{{\rm d}^4k}{(2\pi)^4}\bar{u}_n(p')(S^{\ast}_{nj}+P^{\ast}_{nj}\gamma^5)\delta_{A\alpha_1}\\ &\times\left[{\rm i}\frac{{\not k}+{\not p}'+m_{Q_j}}{(k+p')^2-m_{Q_j}^2}\delta_{\alpha_1\alpha_3}\right]\left(-{\rm i}g_s\gamma^{\mu}T^a_{\alpha_2\alpha_3}\right)\\ &\times\left[{\rm i}\frac{{\not k}+{\not p}+m_{Q_j}}{(k+p)^2-m^2_{Q_j}}\right](S_{nj}+P_{nj}\gamma^5)\delta_{B\alpha_4}u_n(p)\\ &\times\left(\frac{\rm i}{k^2-m^2_{S_i}}\right)V_{H_jq_n}^{\ast}V_{H_jq_n} \end{aligned} $

      (51)

      and

      $ \begin{aligned}[b] \mathcal{M}^{\mu}_{q_n}(V)=\;&\sum_{i,j}\int\frac{{\rm d}^4k}{(2\pi)^4}\bar{u}_n(p')\gamma^{a_1}(V^{\ast}_{nj}+A^{\ast}_{nj}\gamma^5)\delta_{A\alpha_1}\\ &\times\left[{\rm i}\frac{{\not k}+{\not p}'+m_{Q_j}}{(k+p')^2-m_{Q_j}^2}\delta_{\alpha_1\alpha_3}\right]\left(-{\rm i}g_s\gamma^{\mu}T^a_{\alpha_2\alpha_3}\right)\\ &\times\left[{\rm i}\frac{{\not k}+{\not p}+m_{Q_j}}{(k+p)^2-m^2_{Q_j}}\right]\gamma^{a_2}(V_{nj}+A_{nj}\gamma^5)\delta_{B\alpha_4}u_n(p)\\ &\times\left[\frac{\rm i}{k^2-m^2_{V_i}}\left(-g_{\alpha_1\alpha_2}+\frac{k_{\alpha_1}k_{\alpha_2}}{m^2_{V_i}}\right)\right]V^{\ast}_{H_jq_n}V_{H_jq_n}, \end{aligned} $

      (52)

      where $ T^a_{\alpha_n\alpha_m} $ represents the generators of $S U(3)$. Coefficients $ (S_{nj},P_{nj},V_{nj},A_{nj}) $ encompass all contributions from the BLHM, quantified by vertices $ \bar{Q}_jS_iq_n $, $ \bar{q}_nS_i^{\dagger}Q_j $ for scalar and pseudoscalar interactions, and $ \bar{Q}_jV_iq_n $, $ \bar{q}_nV_i^{\dagger}Q_j $ for vector and axial interactions, respectively. Matrix elements $ V^{\ast}_{H_jq_n}V_{H_jq_n} $ pertain to the extended CKM matrix. The amplitudes given by Eqs. (51) and (52) were computed utilizing the $\mathtt{FeynCalc}$ package [46] and $\mathtt{Package\;X}$ [47] available in $\mathtt{Mathematica}$.

      In interactions involving charged bosons, both scalar and vector, the extended CKM matrix for the BLHM, denoted as $ V_{\rm CKM}=V_{Hu}^{\dagger}V_{Hd} $ and introduced in [19], must be taken into account. Here, unitary matrix $ V_{Hu}^{\dagger} $ represents transitions from heavy quarks to light up-type quarks, while $ V_{Hd} $ represents transitions from heavy quarks to light down-type quarks. The CKM extended matrix can be conceptualized as the product of three rotation matrices [48, 49],

      $ \begin{aligned}[b] V_{Hd}=\;&\begin{pmatrix} 1&0&0\\ 0&c_{23}^d&s_{23}{\rm e}^{-{\rm i}\delta_{23}^d}\\ 0&-s_{23}^d{\rm e}^{{\rm i}\delta_{23}^d} &c_{23}^d \end{pmatrix}\\ &\times \begin{pmatrix} c_{13}^d&0&s_{13}^d{\rm e}^{-{\rm i}\delta_{13}^d}\\ 0&1&0\\ -s_{13}{\rm e}^{{\rm i}\delta_{13}^d}&0&c_{13}^d \end{pmatrix}\\ &\times \begin{pmatrix} c_{12}^d&s_{12}^d{\rm e}^{-{\rm i}\delta_{12}^d}&0\\ -s_{12}^d{\rm e}^{{\rm i}\delta_{12}^d}&c_{12}^d&0\\ 0&0&1 \end{pmatrix}, \end{aligned} $

      (53)

      where parameters $ c^d_{ij} $ and $ s^d_{ij} $ are expressed in relation to angles $ (\theta_{12},\theta_{23},\theta_{13}) $ and phases $ (\delta_{12},\delta_{23},\delta_{13}) $.

      In [19] and [27], the authors chose three cases to parameterize matrices $ V_{Hu} $ and $ V_{Hd} $ in such a way that results with greater variation could be obtained. However, in [27], the authors mostly found the same behavior for the three cases of the extended CKM matrices. For this reason, in this study, we chose to use only the third case, given that we also calculated the CMDM.

      We constructed the extended CKM matrix by first substituting values $ s_{23}^d=1/\sqrt{2} $, $ s_{12}^d=s_{13}^d=0 $, $ \delta_{12}^d= \delta_{23}^d=\delta_{13}^d=0 $ into matrix $ V_{Hd} $ in Eq. (53), obtaining matrix

      $ \begin{equation} V_{Hd}= \begin{pmatrix} 1 & 0 & 0\\ 0 & 1/\sqrt{2} & 1/\sqrt{2}\\ 0 & -1/\sqrt{2} & 1/\sqrt{2} \end{pmatrix}, \end{equation} $

      (54)

      and through product $ (V_{Hd}^{\dagger})^{-1}V_{\rm CKM}^{\dagger} $, obtaining matrix

      $ \begin{equation} V_{Hu}= \begin{aligned} & \left( \begin{matrix} 0.973 & 0.221 & 0.008 \\ 0.160 & 0.692 & 0.746 \\ -0.156 & -0.686 & 0.687 \end{matrix} \right). \end{aligned} \end{equation} $

      (55)

      According to the experimental values of the CKM matrix of the SM and the properties of unitarity, the following relations between its rows hold, and similar ones hold for the columns:

      $ \begin{aligned}[b] &\sum_{i=1}^3|V_{ui}|^2-1=-0.0004\pm0.0007\\ &\sum_{i=1}^3|V_{ci}|^2-1=+0.11\pm0.08\\ &\sum_{i=1}^3|V_{ti}|^2-1=+0.00\pm0.2 \end{aligned} $

      (56)

      Similarly, the unitarity conditions for the matrix expressed by Eq. (55) are satisfied:

      $ \begin{aligned}[b] &\sum_{i=1}^3|V_{Hu_{1i}}|^2-1=-0.002\pm0.0002\\ &\sum_{i=1}^3|V_{Hu_{2i}}|^2-1=+0.062\pm0.03\\ &\sum_{i=1}^3|V_{Hu_{3i}}|^2-1=-0.031\pm0.004 \end{aligned} $

      (57)

      Based on relation $ V_{\rm CKM}=V_{Hu}^{\dagger}V_{Hd} $, the existence of a certain level of congruence between $ V_{Hu} $ in Eq. (55) and the $ V_{\rm CKM} $ matrix is natural. However, note from Eqs. (56) and (57) that the flavor constraints are less strict than those found in the $ V_{\rm CKM} $ matrix. Similarly, when the GIM mechanism is applied in the SM, significant suppressions are expected for processes such as rare decays; this does not happen with the extended CKM matrices in the BLHM [19].

    • A.   Results

    • We computed the CMDMs of light quarks $ (u, c, d, s, b) $ under one-loop contributions from heavy quarks and bosons in the BLHM. We also included interactions with fields $ (h^0,Z, \gamma, W^{\pm}) $ of the SM. Interactions with charged bosons $ (W^{\pm}, W^{\prime\pm},H^{\pm}, \phi^{\pm}, \eta^{\pm}) $ were mediated by the matrix elements of $ V_{Hu} $ and $ V_{Hd} $, that is, Eqs. (55) and (54), respectively. Given that the virtual quarks in the dipole could only be the quarks from the BLHM, certain constraints emerged for the contributions of the model toward the light quarks of the SM. One of them arose with the charged bosons because in most valid vertices, only interactions with heavy quark B occurred (see Tables 12 and 13 in Appendix A). Although heavy quarks $ (T, T^5, T^6, T^{2/3}, T^{5/3}) $ do not interact with light quarks $ (u, c, d, s) $, the contributions from the BLHM, because of the interactions with fields $ (H^0,A^0,\phi^0,\eta^0,\sigma,Z') $, enhance their CMDMs in relation to those of the SM. We evaluated the CMDM of the light quarks taking gluon off-shell $ (q^2\neq0) $ in two scenarios: spacelike $ (q^2=-m^2_Z) $ and timelike $ (q^2=m^2_Z) $. By solving the amplitudes given by Eqs. (51) and (52), the expressions of the magnetic form factor in terms of the Passarino-Veltman functions of type $ A_0 $, $ B_0 $, and $ C_0 $ were obtained.

      Vertex Rule
      $ W^{\prime -}\bar{B}u $ $\dfrac{{\rm i}gg_A}{2\sqrt{2}g_B}\gamma^{\mu}P_L(V_{Hu})$
      $ W^{\prime -}\bar{B}c $ $\dfrac{{\rm i}gg_A}{2\sqrt{2}g_B}\gamma^{\mu}P_L(V_{Hu})$
      $ \eta^{-}\bar{B}u $ $-\dfrac{{\rm i}m_Bs_{\beta}^2}{2f\sqrt{2} }P_L(V_{Hu})$
      $ \eta^{-}\bar{B}c $ $ -\dfrac{m_Bs_{\beta}^2}{2f\sqrt{2}}P_L(V_{Hu}) $
      $ \eta^{0}\bar{B}d $ $-\dfrac{{\rm i}m_Bs_{\beta}^2}{4f}P_L$
      $ \eta^{0}\bar{B}s $ $-\dfrac{{\rm i}m_Bs_{\beta}^2}{4f}P_L$
      $ \phi^{-}\bar{B}u $ $\dfrac{{\rm i}Fs^2_{\beta}\left[m_u+m_B+(m_u-m_B)\gamma^5\right]}{2f\sqrt{2}\sqrt{f^2+F^2} }(V_{Hu})$
      $ \phi^{-}\bar{B}c $ $\dfrac{{\rm i}Fs^2_{\beta}\left[m_c+m_B+(m_c-m_B)\gamma^5\right]}{2f\sqrt{2}\sqrt{f^2+F^2} }(V_{Hu})$
      $ \phi^{0}\bar{B}d $ $\dfrac{{\rm i}Fm_Bs^2_{\beta} }{4f\sqrt{f^2+F^2} }P_L$
      $ \phi^{0}\bar{B}s $ $\dfrac{{\rm i}Fm_Bs^2_{\beta} }{4f\sqrt{f^2+F^2} }P_L$
      $ H^{-}\bar{B}u $ $ \dfrac{gm_{B}s_{2\beta}}{4\sqrt{2}m_W}P_L(V_{Hu}) $
      $ H^{-}\bar{B}c $ $ \dfrac{gm_{B}s_{2\beta}}{4\sqrt{2}m_W}P_L(V_{Hu}) $
      $ H^{0}\bar{B}d $ $ -\dfrac{gm_{B}s_{\alpha}s_{\beta}}{4m_W}P_L $
      $ H^{0}\bar{B}s $ $ -\dfrac{gm_{B}s_{\alpha}s_{\beta}}{4m_W}P_L $

      Table 12.  Essential Feynman rules in the BLHM to study the CMDM of light quarks are the 3-point interactions fermion-fermion-scalar (FFS) and fermion-fermion-gauge (FFV) interactions.

      Vertex Rule
      $ h^{0}\bar{B}d $$ \dfrac{gm_{B}c_{\alpha}s_{\beta}}{4m_W}P_L $
      $ h^{0}\bar{B}s $$ \dfrac{gm_{B}c_{\alpha}s_{\beta}}{4m_W}P_L $
      $ A^{0}\bar{B}d $$ -\dfrac{gm_{B}s_{2\beta}}{8m_W}P_L $
      $ A^{0}\bar{B}s $$ -\dfrac{gm_{B}s_{2\beta}}{8m_W}P_L $
      $ \sigma\bar{B}d $$ \dfrac{m_{B}s_{2\beta}}{4\sqrt{2}m_Wf}P_L $
      $ \sigma\bar{B}s $$ \dfrac{m_{B}s_{2\beta}}{4\sqrt{2}m_Wf}P_L $
      $ Z\bar{B}d $$-\dfrac{{\rm i}g^2s_W}{4g'}\gamma^{\mu}P_L$
      $ Z\bar{B}s $$-\dfrac{{\rm i}g^2s_W}{4g'}\gamma^{\mu}P_L$
      Continued on next page

      Table 13.  Essential Feynman rules in the BLHM to study the CMDM of light quarks are the 3-point interactions fermion-fermion-scalar (FFS) and fermion-fermion-gauge (FFV) interactions.

      Figures 2 and 3 show the CMDM plots of the up and charm quarks. Owing to the BLHM contributions to the dipoles of these two quarks having similar magnitudes, $ \mathcal{O}(10^{-8}) $, we plot them together for $\beta= (0.79,~ 1.24,~ 1.49)$ radians. It is important to note that they only received contributions from the B quark, both with charged and neutral bosons.

      Figure 2.  (color online) Dipole of the u and c quarks in the spacelike scenario for $ \beta=(0.79,1.24,1.49) $ radians, $ 1<f< $$ 3 $ TeV, and $ F=5 $ TeV. The behavior of the CMDMs as scale f increases shows the natural decoupling of $ \hat{\mu}_u $ and $ \hat{\mu}_c $ in the BLHM.

      Figure 3.  (color online) Dipole of the u and c quarks in the timelike scenario with $ \beta=(0.79,1.24,1.49) $ radians, $ 1<f< $$ 3 $ TeV, and $ F=5 $ TeV. As in the spacelike case, the same decoupling occurs for $ \hat{\mu}_u $ and $ \hat{\mu}_c $ as f increases.

      Figures 4 and 5 depict the dipoles of the strange and down quarks, respectively, for the same mentioned angles. They receive contributions of the order of $ 10^{-5} $, both in spacelike and timelike configurations.

      Figure 4.  (color online) Dipole of the s and d quarks in the spacelike scenario with $ \beta=(0.79,1.24,1.49) $ radians, $ 1<f<3 $ TeV, and $ F=5 $ TeV. In this case, although the curves are similar to the timelike version, there are differences between $ \hat{\mu}_s $ and $ \hat{\mu}_d $.

      Figure 5.  (color online) Dipole of the s and d quarks in the timelike scenario with $ \beta=(0.79,1.24,1.49) $ radians, $ 1<f<3 $ TeV, and $ F=5 $ TeV. In observables $ \hat{\mu}_d $ and $ \hat{\mu}_s $, magnitudes of the order of $ 10^{-5} $ are obtained that quickly tend toward decoupling for both schemes, $ q^2=\pm m_Z^2 $.

      Figures 6 and 7 show the improved contributions from the BLHM quarks and bosons to the SM bottom quark. Both spacelike and timelike CMDMs are of the order of $ 10^{-3} $. These results indicate that it is necessary to add new interactions between heavy quarks of the T type with light quarks $ (u, c, d, s) $.

      Figure 6.  (color online) Dipole of the b quark in the spacelike scenario with $ \beta=(0.79,1.24,1.49) $ radians, $ 1<f<3 $ TeV, and $ F=5 $ TeV. The decoupling for $ \hat{\mu}_b $ occurs in the same manner for both schemes, $ q^2=\pm m_Z^2 $. However, in these cases, it occurs with a negative sign at the order of $ 10^{-3} $, where the curves are very similar, unlike the other CMDMs, whose curves differ in shape and order from each other.

      Figure 7.  (color online) Dipole of the b quark in the timelike scenario with $ \beta=(0.79,1.24,1.49) $ radians, $ 1<f<3 $ TeV, and $ F=5 $ TeV. The contributions of the heavy quarks to $ \hat{\mu}_b $ in both schemes, $ q^2=\pm m_Z^2 $, are notable in terms of the shape of the curves.

      In the plots shown in Figs. 27, differences are observed between the dipoles evaluated in the spacelike and timelike scenarios; in particular, no negatives values are found in the first one. Tables 5 and 6 show that the dipoles for $ f=2 $ TeV and $ f=3 $ TeV do exhibit differences with respect to the $ f=1 $ case, as presented in Tables 710. We must clarify that we have not included the imaginary parts of the CMDMs because their magnitudes are generally of the order of $ 10^{-20} $. We have included the CMDMs of the light quarks calculated in the SM (see Table 11; note that we have not included their imaginary parts either). If we compare them with those of Tables 5 and 6, only $ \hat{\mu}_c^{\rm{BLHM}} $ is lower than its counterpart in the SM. By contrast, $ \hat{\mu}_b^{\rm{BLHM}} $ exceeds the order of $ \hat{\mu}_b^{\rm SM} $. According to the charm mass, one might expect the contributions to the dipole to be of a magnitude close to that of the bottom; however, they turned out to be very small. This means that the contributions of the quarks $ (T,T^5,T^6,T^{2/3}) $ are much more significant than those of all the heavy bosons because the order of $ \hat{\mu}_b^{\rm{BLHM}} $ is much higher owing to the heavy up-type quarks.

      $ \beta $ 0.79 1.24 1.49
      $ \hat{\mu}_u^{\rm{BLHM}} $ $ -6.80\times10^{-9} $ $ -7.71\times10^{-9} $ $ -8.23\times10^{-9} $
      $ \hat{\mu}_c^{\rm{BLHM}} $ $ -1.04\times10^{-7} $ $ -1.04\times10^{-7} $ $ -1.05\times10^{-7} $
      $ \hat{\mu}_s^{\rm{BLHM}} $ $ 1.54\times10^{-5} $ $ 1.92\times10^{-5} $ $ 1.91\times10^{-5} $
      $ \hat{\mu}_d^{\rm{BLHM}} $ $ 2.61\times10^{-5} $ $ 3.17\times10^{-5} $ $ 1.7\times10^{-5} $
      $ \hat{\mu}_b^{\rm{BLHM}} $ $ -2.44\times10^{-3} $ $ -1,75\times10^{-3} $ $ -2.01\times10^{-3} $

      Table 5.  Numerical values for $\hat{\mu}_{q_i}^{\rm{BLHM}}(\beta,f)$ spacelike at $ f= $ 1 TeV and $ F=5 $ TeV.

      $ \beta $ 0.79 1.24 1.49
      $ \hat{\mu}_{u}^{\rm BLHM} $ $ -6.89\times10^{-9} $ $ 6.45\times10^{-10} $ $ -8.16\times10^{-9} $
      $ \hat{\mu}_{c}^{\rm BLHM} $ $ 5.4\times10^{-8} $ $ 5.14\times10^{-10} $ $ 5.33\times10^{-8} $
      $ \hat{\mu}_s^{\rm BLHM} $ $ 1.55\times10^{-5} $ $ 1.46\times10^{-5} $ $ 1.93\times10^{-5} $
      $ \hat{\mu}_d^{\rm BLHM} $ $ 2.83\times10^{-5} $ $ 3.68\times10^{-5} $ $ 1.59\times10^{-5} $
      $ \hat{\mu}_b^{\rm BLHM} $ $ -2.99\times10^{-3} $ $ -2.08\times10^{-3} $ $ -1.97\times10^{-3} $

      Table 6.  Numerical values for $\hat{\mu}_{q_i}^{\rm BLHM}(\beta,f)$ timelike at $ f= $ 1 TeV and $ F=5 $ TeV.

      $ \beta $ 0.79 1.24 1.49
      $ \hat{\mu}_u^{\rm BLHM} $ $ -2.64\times10^{-9} $ $ -3.58\times10^{-9} $ $ -4.12\times10^{-9} $
      $ \hat{\mu}_c^{\rm BLHM} $ $ -5.15\times10^{-8} $ $ -5.22\times10^{-8} $ $ -5.26\times10^{-8} $
      $ \hat{\mu}_s^{\rm BLHM} $ $ 1.53\times10^{-5} $ $ 1.89\times10^{-5} $ $ 1.88\times10^{-5} $
      $ \hat{\mu}_d^{\rm BLHM} $ $ 2.56\times10^{-5} $ $ 3.11\times10^{-5} $ $ 1.67\times10^{-5} $
      $ \hat{\mu}_b^{\rm BLHM} $ $ -6.0\times10^{-4} $ $ -4.37\times10^{-4} $ $ -5.0\times10^{-4} $

      Table 7.  Numerical values for $\hat{\mu}_{q_i}^{\rm BLHM}(\beta,f)$ spacelike at $ f= $ 2 TeV and $ F=5 $ TeV.

      $ \beta $ 0.79 1.24 1.49
      $ \hat{\mu}_u^{\rm BLHM} $ $ -2.68\times10^{-9} $ $ 5.95\times10^{-10} $ $ -4.08\times10^{-9} $
      $ \hat{\mu}_c^{\rm BLHM} $ $ 2.75\times10^{-8} $ $ 4.34\times10^{-10} $ $ 2.66\times10^{-8} $
      $ \hat{\mu}_s^{\rm BLHM} $ $ 1.54\times10^{-5} $ $ 1.91\times10^{-5} $ $ 1.89\times10^{-5} $
      $ \hat{\mu}_d^{\rm BLHM} $ $ 2.78\times10^{-5} $ $ 3.60\times10^{-5} $ $ 1.56\times10^{-5} $
      $ \hat{\mu}_b^{\rm BLHM} $ $ -7.48\times10^{-4} $ $ -5.19\times10^{-4} $ $ -4.9\times10^{-4} $

      Table 8.  Numerical values for $\hat{\mu}_{q_i}^{\rm BLHM}(\beta,f)$ timelike at $ f= $ 2 TeV and $ F=5 $ TeV.

      $ \beta $ 0.79 1.24 1.49
      $ \hat{\mu}_u^{\rm BLHM} $ $ -1.25\times10^{-9} $ $ -2.20\times10^{-9} $ $ -2.74\times10^{-9} $
      $ \hat{\mu}_c^{\rm BLHM} $ $ -5.15\times10^{-8} $ $ -3.46\times10^{-8} $ $ -3.50\times10^{-8} $
      $ \hat{\mu}_s^{\rm BLHM} $ $ 1.53\times10^{-5} $ $ 1.88\times10^{-5} $ $ 1.87\times10^{-5} $
      $ \hat{\mu}_d^{\rm BLHM} $ $ 2.56\times10^{-5} $ $ 3.10\times10^{-5} $ $ 1.66\times10^{-5} $
      $ \hat{\mu}_b^{\rm BLHM} $ $ -6.09\times10^{-4} $ $ -1.93\times10^{-4} $ $ -2.20\times10^{-4} $

      Table 9.  Numerical values for $\hat{\mu}_{q_i}^{\rm BLHM}(\beta,f)$ spacelike at $ f= $ 3 TeV and $ F=5 $ TeV.

      $ \beta $ 0.79 1.24 1.49
      $ \hat{\mu}_u^{\rm BLHM} $ $ -1.27\times10^{-9} $ $ 5.86\times10^{-10} $ $ -2.71\times10^{-9} $
      $ \hat{\mu}_c^{\rm BLHM} $ $ 1.87\times10^{-8} $ $ 4.19\times10^{-10} $ $ 1.77\times10^{-8} $
      $ \hat{\mu}_s^{\rm BLHM} $ $ 1.54\times10^{-5} $ $ 1.90\times10^{-5} $ $ 1.88\times10^{-5} $
      $ \hat{\mu}_d^{\rm BLHM} $ $ 2.78\times10^{-5} $ $ 3.59\times10^{-5} $ $ 1.55\times10^{-5} $
      $ \hat{\mu}_b^{\rm BLHM} $ $ -3.31\times10^{-4} $ $ -2.29\times10^{-4} $ $ -2.16\times10^{-4} $

      Table 10.  Numerical values for $\hat{\mu}_{q_i}^{\rm BLHM}(\beta,f)$ timelike at $ f=3 $ TeV and $ F=5 $ TeV.

      $ q^2=-m_Z^2 $ $ q^2=m_Z^2 $
      $\hat{\mu}_u^{\rm SM}$ $ -1.15\times10^{-10} $ $ -1.15\times10^{-10} $
      $\hat{\mu}_c^{\rm SM}$ $ -1.16\times10^{-5} $ $ 1.15\times10^{-5} $
      $\hat{\mu}_s^{\rm SM}$ $ -1.38\times10^{-7} $ $ 1.37\times10^{-7} $
      $\hat{\mu}_d^{\rm SM}$ $ -5.07\times10^{-10} $ $ -5.04\times10^{-10} $
      $\hat{\mu}_b^{\rm SM}$ $ -1.61\times10^{-4} $ $ 1.55\times10^{-4} $

      Table 11.  Numerical values for $\hat{\mu}_{q_i}^{\rm SM}$ in the SM, spacelike and timelike [17].

    VI.   CONCLUSIONS
    • We calculated the dipoles of light quarks of the SM $ (u, c, d, s, b) $ with contributions from heavy quarks and bosons of the BLHM, as well as bosons $ (h^0, Z, \gamma, W^{\pm}) $ of the SM, both in the spacelike $ (q^2=-m^2_Z) $ and timelike $ (q^2=m^2_Z) $ scenarios. We found that the magnitudes of our results are greater than similar ones in the SM. The dipole for which we obtained the largest contributions from the BLHM is the CMDM of the bottom quark, $ \mathcal{O}(10^{-3}) $, which receives contributions from all heavy quarks and bosons. By contrast, the dipoles of the other light quarks $ (u, c, d, s) $ only receive contributions from heavy quark B and heavy bosons [19], as can be observed from the Feynman rules in Tables 12 and 13. Accordingly, we conclude that it is also necessary to extend interactions of the heavy up-type quarks to all four light quarks $ (u, c, d, s) $. In this study, we also used extended CKM matrices $ V_{Hu} $ and $ V_{Hd} $, parameterizing only one case of them in relation to the $V_{\rm CKM}$ matrix. The elements of the extended matrices further constrained dipoles $ \hat{\mu}_{q_i} $ in comparison with the dipoles calculated for the top quark in [27], as in the BLHM. The magnitudes of the CMDMs calculated in the BLHM, mainly for the bottom quark, encourage us to expect new experimental signals that may provide hints of new physics. It is important to remember that the CMDMs or CEDMs of light quarks have not been evaluated in other BSM models as we did in this study. We hope that this will be eventually done to enrich our own work on this topic.

      Table 13-continued from previous page
      Vertex Rule
      $ Z'\bar{B}d $ $-\dfrac{{\rm i}gg_A}{4g_B}\gamma^{\mu}P_L$
      $ Z'\bar{B}s $ $-\dfrac{{\rm i}gg_A}{4g_B}\gamma^{\mu}P_L$
      $ \gamma\bar{B}d $ $-\dfrac{{\rm i}gs_W}{4}\gamma^{\mu}$
      $ \gamma\bar{B}s $ $-\dfrac{{\rm i}gs_W}{4}\gamma^{\mu}$
Reference (49)

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