-
In order to understand the classification of the meson-baryon states considered, it is convenient to begin with the interaction we use. Let us look, as an example, at the
$ B^- \Lambda_b \to B^- \Lambda_b $ transition shown in Fig. 1. By means of the mechanism of Fig. 1(b), one can exchange a$ u\bar u $ state between$ B^- $ and$ \Lambda_b $ . This could physically correspond to a$ \pi $ ,$ \rho $ or$ \omega $ meson. One can equally exchange a$ b\bar b $ pair which could correspond to$ \eta_b $ or$ \Upsilon $ , but we can anticipate that$ \eta_b $ or$ \Upsilon $ exchange, corresponding to a meson propagator, would be very much suppressed because of the large mass of the$ b\bar b $ state compared to$ u\bar u $ .Figure 1. (a) Quark representation of
$B^- \Lambda_b$ ; (b) Meson exchange mechanism for the$B^- \Lambda_b \to B^- \Lambda_b$ transition.We next consider the case where we have
$ K^- $ instead of$ B^- $ in Fig. 1, where the chiral Lagrangians can be used to obtain the strength of the exchange mechanism. We recall the observation in Ref. [79] that the chiral Lagrangians can be obtained from the local hidden gauge Lagrangians which rely on the exchange of vector mesons [80-83]. In the$ K^- \Lambda_b \to K^- \Lambda_b $ interaction, we have the$ u\bar u $ exchange and the s quark as a spectator, the same as in the diagram Fig. 1(b) where the b quark is a spectator. We can make a mapping from the$ K^- \Lambda_b \to K^- \Lambda_b $ interaction to the$ B^- \Lambda_b \to B^- \Lambda_b $ interaction at the quark level, taking into account that when writing the S matrix at the meson level the normalization factors of the meson fields$ \dfrac{1}{\sqrt{2 E_K}} $ ,$ \dfrac{1}{\sqrt{2 E_B}} $ are different. These considerations were made in Ref. [84].In the evaluation of the
$ B^- \Lambda_b \to B^- \Lambda_b $ transition in Fig. 1(b), instead of the Langrangians one can use the operators at the quark level, both in the upper vertex$ BBV $ [85] and in the lower vertex$ \Lambda_b \Lambda_b V $ , with V the exchanged vector meson [61], to get the same result. For practical reasons, we use the Lagrangian for the upper vertex$ {\cal{L}} = -{\rm i}g\, \langle\left[P,\partial_\mu P\right]V^\mu\rangle, $
(1) where
$ \langle\cdots\rangle $ stands for the matrix trace,$ g = \dfrac{M_V}{2f_\pi} $ ($ M_V \sim 800\,\ $ MeV is the vector mass,$ f_\pi = 93\,\ $ MeV), and$ P,\; V $ are the$ q\bar q $ matrices written in terms of pseudoscalar or vector mesons, with quarks$ u,\; d,\; s,\; b $ . Hence$ P = \left( {\begin{array}{*{20}{c}} {\frac{1}{{\sqrt 2 }}{\pi ^0} + \frac{1}{{\sqrt 3 }}\eta + \frac{1}{{\sqrt 6 }}\eta '}&{{\pi ^ + }}&{{K^ + }}&{{B^ + }}\\ {{\pi ^ - }}&{ - \frac{1}{{\sqrt 2 }}{\pi ^0} + \frac{1}{{\sqrt 3 }}\eta + \frac{1}{{\sqrt 6 }}\eta '}&{{K^0}}&{{B^0}}\\ {{K^ - }}&{{{\bar K}^0}}&{ - \frac{1}{{\sqrt 3 }}\eta + \sqrt {\frac{2}{3}} \eta '}&{B_s^0}\\ {{B^ - }}&{{{\bar B}^0}}&{\bar B_s^0}&{{\eta _b}} \end{array}} \right), $
(2) $ V = \left( {\begin{array}{*{20}{c}} {\frac{1}{{\sqrt 2 }}{\rho ^0} + \frac{1}{{\sqrt 2 }}\omega }&{{\rho ^ + }}&{{K^{* + }}}&{{B^{* + }}}\\ {{\rho ^ - }}&{ - \frac{1}{{\sqrt 2 }}{\rho ^0} + \frac{1}{{\sqrt 2 }}\omega }&{{K^{*0}}}&{{B^{*0}}}\\ {{K^{* - }}}&{{{\bar K}^{*0}}}&\phi &{B_s^{*0}}\\ {{B^{* - }}}&{{{\bar B}^{*0}}}&{\bar B_s^{*0}}&\Upsilon \end{array}} \right), $
(3) where we use the
$ \eta $ -$ \eta' $ mixing of Ref. [86]. The lower vertex is of the type$ V_\nu \gamma^\nu $ , and we make the approximation that the momenta of the particles are small compared to their masses and$ \gamma^\nu \to \gamma^0 \equiv 1 $ , rendering the interaction spin independent. This means that after contraction of$ V^\mu V^\nu $ , only the$ \partial_0 $ component of$ \partial_\mu $ in Eq. (1) is operative. The lower vertex is still evaluated at the quark level and the Lagrangian is trivial in terms of the operators,$ L \to \left\{ {\begin{array}{*{20}{c}} {\dfrac{g}{{\sqrt 2 }}(u\bar u - d\bar d),\; {\rm{for}}\; {\rho ^0}}\\ {\dfrac{g}{{\sqrt 2 }}(u\bar u + d\bar d),\; {\rm{for}}\; \omega } \end{array}} \right. , $
(4) which has to be sandwiched between the baryon wave functions. The next step to complete the program is to write the wave functions, and here we divert from using SU(4) or other extensions of SU(5), because the heavy quarks are not identical particles to the
$ u,\;d,\;s $ quarks. We single out the heavy quark and impose the flavor-spin symmetry on the light quarks. If instead we have two or three b quarks, then we impose the flavor-spin symmetry on the b quarks. Once this is clarified, we have the following meson-baryon states with two b quarks:$ 1) $ $ bb $ in the baryon,$ \Xi_{bb}, \;\; \Omega_{bb}, $
and the meson-baryon states are
$ \pi \,\Xi_{bb},\quad \eta \,\Xi_{bb},\quad K \,\Omega_{bb}. $
(5) Since we have two identical b quarks, the spin wave function has to be symmetric in these quarks. We take them as number 1 and 2, and thus we must use the mixed symmetric spin wave function
$ \chi_{MS} $ for the first two quarks.$ 2) $ One b quark in the baryon and one in the meson. The meson-baryon states are$ \bar B \,\Lambda_b,\quad \bar B \,\Sigma_b,\quad \bar B_s \,\Xi_b,\quad \bar B_s \,\Xi_b^\prime. $
(6) In this case the flavor-spin symmetry is imposed on the second and third (light) quarks. The baryon states are classified as shown in Table 1.
states $I,J$ flavor spin $\Xi^0_{bb}$ $\frac{1}{2},\, \frac{1}{2}$ $bbu$ $\chi_{MS}(12)$ $\Omega^-_{bb}$ $0,\, \frac{1}{2}$ $bbs$ $\chi_{MS}(12)$ $\Lambda_b^0$ $0, \, \frac{1}{2}$ $b\frac{1}{\sqrt2}(ud-du)$ $\chi_{MA}(23)$ $\Sigma_b^0$ $1, \, \frac{1}{2}$ $b\frac{1}{\sqrt2}(ud+du)$ $\chi_{MS}(23)$ $\Xi_b^0$ $\frac{1}{2},\, \frac{1}{2}$ $b\frac{1}{\sqrt2}(us-su)$ $\chi_{MA}(23)$ $\Xi_b^{'0}$ $\frac{1}{2},\, \frac{1}{2}$ $b\frac{1}{\sqrt2}(us+su)$ $\chi_{MS}(23)$ Table 1. Wave functions for baryons with
$J^P=\frac{1}{2}^+$ and$I=0,\frac{1}{2},1$ .$MS$ and$MA$ stand for mixed symmetric and mixed antisymmetric.We need
$ \chi_{MS}(12) $ ,$ \chi_{MS}(23) $ and$ \chi_{MA}(23) $ , which are given in Ref. [87] for$ s_3 = \frac{1}{2} $ ,$ \chi_{MS}(12) = \frac{1}{\sqrt{6}} (\uparrow \downarrow \uparrow +\downarrow\uparrow\uparrow-2\uparrow\uparrow\downarrow), $
(7) $ \chi_{MS}(23) = \frac{1}{\sqrt{6}} (\uparrow\uparrow\downarrow+\uparrow\downarrow\uparrow-2\downarrow\uparrow\uparrow), $
(8) $ \chi_{MA}(23) = \frac{1}{\sqrt{2}} (\uparrow\uparrow\downarrow-\uparrow\downarrow\uparrow). $
(9) Note that with our spin independent interaction,
$ \Xi_{bb} $ and$ \Omega_{bb} $ can have spin overlap with the other baryon components of Table 1, since$ \langle \chi_{MS}(12)| \chi_{MS}(23) \rangle = -\frac{1}{2}, $
(10) $ \langle \chi_{MS}(12)| \chi_{MA}(23) \rangle = -\frac{\sqrt{3}}{2}. $
(11) We also consider vector-baryon states and pseudoscalar combinations with baryons with
$ J^P = \frac{3}{2}^+ $ ,$ \Xi^*_{bb} $ ,$ \Omega^*_{bb} $ ,$ \Sigma_b^* $ ,$ \Xi^*_b $ , shown in Table 2. They all have the full symmetric spin wave function$ \chi_S $ ,states $I,J$ Flavor spin $\Xi_{bb}^{\ast0}$ $\frac{1}{2}, \, \frac{3}{2}$ $bbu$ $\chi_{S}$ $\Omega_{bb}^{\ast-}$ $0,\, \frac{3}{2}$ $bbs$ $\chi_{S}$ $\Sigma_b^{\ast0}$ $1,\, \frac{3}{2}$ $b\frac{1}{\sqrt2}(ud+du)$ $\chi_{S}$ $\Xi_b^{\ast0}$ $\frac{1}{2},\, \frac{3}{2}$ $b\frac{1}{\sqrt2}(us+su)$ $\chi_{S}$ Table 2. Wave functions for baryons with
$J^P=\frac{3}{2}^+$ and$I=0,\frac{1}{2},1$ . S in$\chi_S$ stands for full symmetric.$ \chi_S(s_3 = 1) = \uparrow\uparrow\uparrow. $
(12) The combination of vector-baryon (
$ \frac{3}{2}^+ $ ) gives rise to states in a region difficult to identify experimentally [57] and we do not study them.In the case of vector-baryon interaction, the upper vertex is evaluated using Eq. (1) by substituting
$ \left[P,\partial_\mu P\right] $ with$ \left[V_\nu,\partial_\mu V^\nu\right] $ . In the limit of small momenta,$ V^\mu $ of Eq. (1) is the exchanged vector. Hence, the interaction is calculated in the same way as for pseudoscalars except that there is an extra$ \vec \epsilon \cdot \vec \epsilon\,' $ factor which gives the spin independence of the upper vertex [61]. Therefore, the interaction is spin independent. This feature allows to classify the channels into different blocks:a)
$ \pi \,\Xi_{bb} $ ,$ \eta \,\Xi_{bb} $ and$ K \,\Omega_{bb} $ with$ \chi_{MS}(12) $ ,$ \bar B \,\Lambda_b $ and$ \bar B_s \,\Xi_b $ with$ \chi_{MA}(23) $ ;b)
$ \pi \,\Xi_{bb} $ ,$ \eta \,\Xi_{bb} $ and$ K \,\Omega_{bb} $ with$ \chi_{MS}(12) $ ,$ \bar B \,\Sigma_b $ and$ \bar B_s \,\Xi'_b $ with$ \chi_{MS}(23) $ ;c)
$ \rho \,\Xi_{bb} $ ,$ \omega\,\Xi_{bb} $ ,$ \phi \,\Xi_{bb} $ and$ K^\ast \,\Omega_{bb} $ with$ \chi_{MS}(12) $ ,$ \bar B^\ast \,\Lambda_{b} $ and$ \bar B_s^\ast \,\Xi_b $ with$ \chi_{MA}(23) $ ;d)
$ \rho \,\Xi_{bb} $ ,$ \omega \,\Xi_{bb} $ ,$ \phi \,\Xi_{bb} $ and$ K^\ast \,\Omega_{bb} $ with$ \chi_{MS}(12) $ ,$ \bar B^\ast \,\Sigma_b $ and$ \bar B_s^\ast \,\Xi_b^\prime $ with$ \chi_{MS}(23) $ ;e)
$ \pi \,\Xi^*_{bb} $ ,$ \eta \,\Xi^*_{bb} $ ,$ K \,\Omega^*_{bb} $ ,$ \bar B \,\Sigma^*_b $ and$ \bar B_s \,\Xi^*_b $ with all states in$ \chi_{S} $ .Taking into account our isospin phase convention
$ (-\pi^+, \pi^0, \pi^-) $ ,$ (B^+, B^0) $ ,$ (\bar B^0, -B^-) $ ,$ (K^+, K^0) $ and$ (\bar K^0, -K^-) $ , we can construct the isospin wave function for the blocks to have isospin$ I = \frac{1}{2} $ for the global "$ \Xi_{bb} $ " states. Using the vector-exchange interaction discussed above, we obtain a potential$ V_{ij} $ for the$ i \to j $ transition of the type$ V_{ij} = D_{ij}\, \frac{1}{4 f_{\pi}^2}\, (k^0+k'^0), $
(13) where,
$ k^0,\; k'^0 $ are the meson energies in channel i and channel j, respectively, and$ D_{ij} $ are the coefficients which are given in the tables below.Note that since
$ \chi_{MS}(12) $ in the$ \Xi_{bb} $ ,$ \Omega_{bb} $ states overlaps with$ \chi_{MS}(23) $ and$ \chi_{MA}(23) $ , blocks a) and b) can mix and have to be put together. The same can be said for blocks c) and d), which also have to be put together. We then obtain the$ D_{ij} $ coefficients shown in Tables 4, 6, 8 (note that we changed the order of baryon-meson in the tables, which must be taken into account when constructing the isospin wave functions). In Tables 3, 5, 7 we show the thresholds of the channels considered. The masses which are not tabulated in PDG [63] are taken from Refs. [13, 88]. In the tables there are terms which go with parameter$ \lambda $ . They correspond to transitions that require$ B^* $ exchange. Because of the large mass of$ B^* $ compared to the light vectors, these terms are very much suppressed. With the same considerations as in Ref. [61], we estimate$ \lambda $ aschannel $\Xi_{bb}\,\pi$ $\Xi_{bb} \,\eta$ $\Omega_{bb} \,K$ $\Lambda_b \,\bar B$ $\Sigma_b \,\bar B$ $\Xi_b \,\bar B_s$ $\Xi_b^\prime \,\bar B_s$ threshold/MeV $10335$ $10745$ $10756$ $10899$ $11092$ $11160$ $11302$ Table 3. Pseudoscalar-baryon(
$\frac{1}{2}^+$ ) (PB) channels considered for the sector with$J^P=\frac{1}{2}^-$ .$J^P=\frac{1}{2}^-$ $\Xi_{bb} \,\pi$ $\Xi_{bb} \,\eta$ $\Omega_{bb} \,K$ $\Lambda_b \,\bar B$ $\Sigma_b \,\bar B$ $\Xi_b \,\bar B_s$ $\Xi_b^\prime \,\bar B_s$ $\Xi_{bb} \,\pi$ $-2$ $0$ $\sqrt{\frac{3}{2}}$ $\frac{3}{4}\lambda$ $-\frac{1}{4}\lambda$ $0$ $0$ $\Xi_{bb} \,\eta$ $0$ $-\frac{2}{\sqrt 3}$ $\frac{1}{2\sqrt 2}\lambda$ $\frac{1}{2\sqrt 2}\lambda$ $-\frac{1}{2\sqrt 2}\lambda$ $\frac{1}{2\sqrt 6}\lambda$ $\Omega_{bb} \,K$ $-1$ $0$ $0$ $-\sqrt{\frac{3}{8}}\lambda$ $-\frac{1}{2\sqrt 2}\lambda$ $\Lambda_b \,\bar B$ $-1$ $0$ $-1$ $0$ $\Sigma_b \,\bar B$ $-3$ $0$ $\sqrt 3$ $\Xi_b \,\bar B_s$ $-1$ $0$ $\Xi_b^\prime \,\bar B_s$ $-1$ Table 4.
$D_{ij}$ coefficients for the PB sector with$J^P=\frac{1}{2}^-$ .channel $\Lambda_b\bar B^\ast$ $\Xi_{bb} \rho$ $\Xi_{bb}\omega$ $\Sigma_b \bar B^\ast$ $\Omega_{bb}K^\ast$ $\Xi_b \bar B_s^\ast$ $\Xi_{bb}\phi$ $\Xi_b^\prime\bar B_s^\ast$ threshold/MeV $10945$ $10972$ $10980$ $11138$ $11156$ $11208$ $11216$ $11350$ Table 5. Vector-baryon(
$\frac{1}{2}^+$ ) (VB) channels considered for the sector with$J^P=\frac{1}{2}^-,\frac{3}{2}^-$ .$J^P=\frac{1}{2}^-,\,\frac{3}{2}^-$ $\Lambda_b \,\bar B^\ast$ $\Xi_{bb} \,\rho$ $\Xi_{bb} \,\omega$ $\Sigma_b \,\bar B^\ast$ $\Omega_{bb} \,K^\ast$ $\Xi_b \,\bar B_s^\ast$ $\Xi_{bb}\,\phi$ $\Xi_b^\prime \,\bar B_s^\ast$ $\Lambda_b \,\bar B^\ast$ $-1$ $\frac{3}{4}\lambda$ $\frac{\sqrt 3}{4}\lambda$ 0 0 $-1$ 0 0 $\Xi_{bb} \,\rho$ $-2$ 0 $-\frac{1}{4}\lambda$ $\sqrt{\frac{3}{2}}$ 0 0 0 $\Xi_{bb} \,\omega$ 0 $\frac{\sqrt 3}{4}\lambda$ $-\frac{1}{\sqrt 2}$ 0 0 0 $\Sigma_b \,\bar B^\ast$ $-3$ 0 0 0 $\sqrt 3$ $\Omega_{bb} \,K^\ast$ $-1$ $\frac{1}{\sqrt 2}\lambda$ 1 $-\frac{1}{2\sqrt 2}\lambda$ $\Xi_b \,\bar B_s^\ast$ $-1$ $\sqrt{\frac{3}{8}}\lambda$ 0 $\Xi_{bb}\,\phi$ 0 $-\frac{1}{2\sqrt 2}\lambda$ $\Xi_b^\prime\bar B_s^\ast$ $-1$ Table 6.
$D_{ij}$ coefficients for the VB sector with$J^P=\frac{1}{2}^-,\frac{3}{2}^-$ .channel $\Xi_{bb}^*\, \pi$ $\Xi_{bb}^* \,\eta$ $\Omega_{bb}^* \,K$ $\Sigma_b^* \,\bar B$ $\Xi_b^* \,\bar B_s$ threshold/MeV $10374$ $10784$ $10793$ $11113$ $11320$ Table 7. Pseudoscalar-baryon(
$\frac{3}{2}^+$ ) (PB) channels considered for the sector with$J^P=\frac{3}{2}^-$ .$J^P=\frac{3}{2}^-$ $\Xi_{bb}^*\pi$ $\Xi_{bb}^*\eta$ $\Omega_{bb}^*K$ $\Sigma_b^* \bar B$ $\Xi_b^*\bar B_s$ $\Xi_{bb}^*\pi$ $-2$ 0 $\sqrt{\frac{3}{2}}$ $\frac{1}{2}\lambda$ 0 $\Xi_{bb}^*\eta$ 0 $-\frac{2}{\sqrt 3}$ $-\frac{1}{\sqrt 2}\lambda$ $-\frac{1}{\sqrt 6}\lambda$ $\Omega_{bb}^*K$ $-1$ 0 $\frac{1}{\sqrt 2}\lambda$ $\Sigma_b^* \bar B$ $-3$ $\sqrt 3$ $\Xi_b^*\bar B_s$ $-1$ Table 8.
$D_{ij}$ coefficients for the PB sector with$J^P=\frac{3}{2}^-$ .$ \lambda = \frac{-m^2_{V}}{(m_B - m_\eta)^2 - m^2_{B^*}}\approx 0.1 \, . $
(14) We note that when the light vector mesons are exchanged, the heavy quarks are spectators, and hence these terms automatically fulfill the rules of heavy quark symmetry. The exchange of
$ B^* $ makes the b quark active. This term goes barely as$ {\mathcal O}(\frac{1}{m_Q}) $ (with$ m_Q $ the heavy quark mass) and is not subject to the heavy quark spin symmetry rules. Note that these terms are very small in our approach, as expected.We turn now to the
$ \Omega_{bbb} $ states. Here, the coupled channels are$ \eta \,\Omega_{bbb},\; \bar B \,\Xi^*_{bb}, \;\bar B_s \,\Omega^*_{bb} $ . The baryon states involved are tabulated in Table 9. The$ \eta\, \Omega_{bbb} $ ,$ \bar B \,\Xi^{*}_{bb} $ ,$ \bar B_s \,\Omega^{*}_{bb} $ channels with$ J^P = \frac{3}{2}^- $ , do not couple with the "$ \Xi_{bb} $ " states since they contain one more b quark. In Table 10, we show the threshold masses of the pseudoscalar-baryon channels, and in Table 11 the$ D_{ij} $ coefficients.states $I,J$ flavor spin $\Omega^-_{bbb}$ $0, \, \frac{3}{2}$ $bbb$ $\chi_{S}$ $\Xi^{*0}_{bb}$ $\frac{1}{2}, \,\frac{3}{2}$ $bbu$ $\chi_{S}$ $\Omega^{*-}_{bb}$ $0, \, \frac{3}{2}$ $bbs$ $\chi_{S}$ Table 9. Wave functions of baryons with
$J^P=\frac{3}{2}^+$ and$I=0,\frac{1}{2}$ .channel $\Omega_{bbb}\,\eta$ $\Xi_{bb}^* \,\bar B$ $\Omega_{bb}^* \,\bar B_s$ threshold/MeV $15382$ $15515$ $15664$ Table 10. PB channels considered for the sector with
$J^P=\frac{3}{2}^-$ and three b quarks.$J^P=\frac{3}{2}^-$ $\Omega_{bbb}\,\eta$ $\Xi_{bb}^* \,\bar B$ $\Omega_{bb}^* \,\bar B_s$ $\Omega_{bbb}\eta$ 0 $-\frac{2}{\sqrt 6}\lambda$ $-\frac{1}{\sqrt 3}\lambda$ $\Xi_{bb}^*\bar B$ $-2$ $\sqrt 2$ $\Omega_{bb}^*\bar B_s$ $-1$ Table 11.
$D_{ij}$ coefficients for the PB sector with$J^P=\frac{3}{2}^-$ and three b quarks. -
With the
$ V_{ij} $ potential of Eq. (13), we solve the Bethe-Salpeter equation in coupled channels$ T = [1-VG]^{-1}V, $
(15) where G is the diagonal meson-baryon loop function given by
$\begin{split}G_l =& {\rm i}\int\frac{ {\rm d}^4q}{(2\pi)^4}\; \frac{M_l}{E_l(\vec q\,)}\;\frac{1}{k^0+p^0-q^0-E_l(\vec q\,)+{\rm i}\epsilon}\;\frac{1}{q^2-m_l^2+{\rm i}\epsilon}\\ =& \int_{|\vec q\,|<q_{\rm max}}\frac{{\rm d}^3 q}{(2\pi)^3}\;\frac{1}{2\omega_l(\vec q\,)} \;\frac{M_l}{E_l(\vec q\,)}\;\frac{1}{k^0+p^0-\omega_l(\vec q\,)-E_l(\vec q\,)+{\rm i}\epsilon}, \end{split} $
(16) with
$ p^0 $ the energy of the incoming baryon in the meson-baryon rest frame.$ m_l $ and$ M_l $ are the meson and baryon masses, and$ \omega_l $ and$ E_l $ their energies$ \omega_l = \sqrt{m_l^2+ \vec q^{\;2}} $ and$ E_l = \sqrt{M_l^2+ \vec q^{\;2}} $ . As in the studies [61, 85, 89], we use a three-momentum cut-off$ q_{\rm max} = 650 $ MeV to regularize the loop function. The poles are searched for on the second Riemann sheet, as done in Refs. [61, 85, 89], and the couplings of the states to the different channels are obtained from the residues of the$ T_{ij} $ matrix at the pole$ z_R $ , knowing that close to the pole one has$ T_{ij}(s) = \frac{g_i\,g_j}{\sqrt s-z_R}. $
(17) The second Riemann sheet is obtained using
$ G^{II}(s) $ instead of$ G(s) $ given by$ G_l^{II} = \left\{ {\begin{array}{*{20}{c}} {{G_l}(s),}&{{\rm{for\; Re}}(\sqrt s ) < {{\sqrt s }_{{\rm th},{\kern 1pt} l}}}\\ {{G_l}(s) + {\rm i}\dfrac{{2{M_l}q}}{{4\pi \sqrt s }},}&{{\rm{for \;Re}}(\sqrt s ) \geqslant {{\sqrt s }_{{\rm th},{\kern 1pt} l}}} \end{array}} \right., $
(18) where
$ \sqrt{s}_{{\rm th},\,l} $ is the threshold mass of the l-th channel, and$ q = \frac{\lambda^{1/2}(s,m_l^2,M_l^2)}{2\sqrt s}, \quad \text{with}\; {\rm Im}(q)>0. $
(19) In Tables 12 and 13, we show the couplings and the wave function at the origin for two states with
$ J^P = \frac{1}{2}^- $ obtained from the coupled channels of Table 4. In addition to the couplings$ g_i $ , we show the values of$ g_i\,G^{II}_i $ at the pole, which according to Ref. [36] provide the strength of the wave function at the origin.${\bf{10408.18+}}{\bf{i}}{\bf{93.18}}$ $\Xi_{bb} \,\pi$ $\Xi_{bb} \,\eta$ $\Omega_{bb} \,K$ $\Lambda_b \,\bar B$ $\Sigma_b \,\bar B$ $\Xi_b \,\bar B_s$ $\Xi_b^\prime \,\bar B_s$ $g_i$ $1.69+{\rm i}1.21$ $-0.02-{\rm i}0.09$ $-0.86-{\rm i}0.73$ $-1.03-{\rm i}0.31$ $0.50+{\rm i}0.23$ $-0.28-{\rm i}0.19$ $-0.16-{\rm i}0.12$ $g_i\,G^{II}_i$ $-73.58-{\rm i}12.87$ $0.01+{\rm i}0.58$ $4.52+{\rm i}5.41$ $0.79+{\rm i}0.39$ $-0.29-{\rm i}0.18$ $0.14+{\rm i}0.12$ $0.07+{\rm i}0.06$ Table 12. The
$g_i$ couplings of the$10408.18+{\rm i}93.18$ state (generated dynamically in the PB sector with$J^P=\frac{1}{2}^-$ ) to various channels and$g_i\,G^{II}_i$ (in MeV).${\bf{10686.39+}}{\bf{i}}{\bf{0.08}}$ $\Xi_{bb}\,\pi$ $\Xi_{bb}\,\eta$ $\Omega_{bb} \,K$ $\Lambda_b \,\bar B$ $\Sigma_b \,\bar B$ $\Xi_b \, \bar B_s$ $\Xi_b^\prime \, \bar B_s$ $g_i$ $0.01-{\rm i}0.05$ $-0.10+{\rm i}0.02$ $-0.05+{\rm i}0.04$ $0.06+{\rm i}0.02$ $19.03$ $0.02+{\rm i}0.02$ $-10.80$ $g_i \,G^{II}_i$ $1.57+{\rm i}0.51$ $1.52-{\rm i}0.23$ $0.72-{\rm i}0.52$ $-0.11-{\rm i}0.03$ $-18.78$ $-0.02-{\rm i}0.02$ $7.23$ Table 13. The
$g_i$ couplings of the$10686.39+{\rm i}0.08$ state (generated dynamically in the PB sector with$J^P=\frac{1}{2}^-$ ) to various channels and$g_i \,G^{II}_i$ (in MeV).We find two states, one at
$ 10408 $ MeV with a width of about$ 186 $ MeV , which couples mostly to the$ \Xi_{bb}\,\pi $ component, with a non-negligible coupling to$ \Omega_{bb} \,K $ and$ \Lambda_b \,\bar B $ . The large width of this state stems from the large coupling to the$ \Xi_{bb}\,\pi $ channel and the fact that this channel is open. The second state appears at$ 10686 $ MeV with a very small width. It couples mostly to the$ \Sigma_b \,\bar B $ channel, which is closed. The$ \Xi_{bb}\,\pi $ channel is open, but the coupling to this channel is very small, which justifies the small width obtained.Some of the components are quite bound and one may think that these components should be very small. Yet, this is not the case, since, as shown in detail in Ref. [66] the size of the channels is not linked to the binding but is determined by the cut-off, and
$ r^2 |\psi(r)|^2 $ peaks around$ r = 0.7 $ fm, with still a significant strength around 1 fm.We now consider the states generated from the coupled channels of Table 6 from vector-baryon (
$ \frac{1}{2}^+ $ ) states. We find three states with zero width, degenerate in$ J^P = \frac{1}{2}^-, \frac{3}{2}^- $ . We note that the additional pion exchange would break this degeneracy but, as discussed in Ref. [66], its effects are largely incorporated in our approach with a suitable choice of$ q_{\rm max} $ , and only a small part remains and produces a small splitting between the$ \frac{1}{2}^- $ and$ \frac{3}{2}^- $ states. The small difference between the masses of the hidden charm pentaquark states$ P_c(4440) $ and$ P_c(4452) $ of Ref. [41], assumed to be$ \frac{1}{2}^-, \frac{3}{2}^- $ , respectively, corroborates this finding.In Tables 14, 15 and 16, we show the properties of these three states. The first state appears at
$ 10732 $ MeV and couples mostly to$ \Sigma_b \,\bar B^\ast $ , the second is at$ 10807 $ MeV and couples mostly to$ \Lambda_b \,\bar B^\ast $ , while the third appears at$ 10869 $ MeV and couples mostly to$ \Xi_{bb}\, \rho $ . Note that all channels are closed which is why we obtain zero widths.${\bf{10732.01+}}{\bf{i}}{\bf{0}}$ $\Lambda_b \,\bar B^\ast$ $\Xi_{bb}\, \rho$ $\Xi_{bb} \,\omega$ $\Sigma_b \,\bar B^\ast$ $\Omega_{bb} \,K^\ast$ $\Xi_b \,\bar B_s^\ast$ $\Xi_{bb}\,\phi$ $\Xi_b^\prime \,\bar B_s^\ast$ $g_i$ $-0.01$ $0.15$ $-0.14$ $19.13$ $-0.10$ $0$ $-0.03$ $-10.86$ $g_i\,G^{II}_i$ $0.02$ $-1.01$ $0.88$ $-18.72$ $0.42$ $0$ $0.09$ $7.18$ Table 14. The
$g_i$ couplings of the$10732.01+{\rm i}0$ state (generated dynamically in the VB sector with$J^P=\frac{1}{2}^-, \frac{3}{2}^-$ ) to various channels and$g_i \,G^{II}_i$ (in MeV).${\bf{10807.41+}}{\bf{i}}{\bf{0}}$ $\Lambda_b \,\bar B^\ast$ $\Xi_{bb}\, \rho$ $\Xi_{bb}\,\omega$ $\Sigma_b\, \bar B^\ast$ $\Omega_{bb} \,K^\ast$ $\Xi_b \,\bar B_s^\ast$ $\Xi_{bb}\,\phi$ $\Xi_b^\prime \,\bar B_s^\ast$ $g_i$ $7.82$ $-0.66$ $-0.12$ $0.06$ $0.16$ $7.57$ $-0.10$ $-0.04$ $g_i \,G^{II}_i$ $-18.77$ $5.52$ $0.97$ $-0.07$ $-0.76$ $-7.37$ $0.39$ $0.03$ Table 15. The
$g_i$ couplings of the$10807.41+{\rm i}0$ state (generated dynamically in the VB sector with$J^P=\frac{1}{2}^-, \frac{3}{2}^-$ ) to various channels and$g_i \,G^{II}_i$ (in MeV).${\bf{10869.63+}}{\bf{i}}{\bf{0}}$ $\Lambda_b \,\bar B^\ast$ $\Xi_{bb} \,\rho$ $\Xi_{bb} \,\omega$ $\Sigma_b \,\bar B^\ast$ $\Omega_{bb} \,K^\ast$ $\Xi_b \,\bar B_s^\ast$ $\Xi_{bb}\,\phi$ $\Xi_b^\prime \,\bar B_s^\ast$ $g_i$ $0.61$ $3.57$ $-0.36$ $-0.37$ $-2.41$ $1.18$ $0.48$ $0.26$ $g_i\,G^{II}_i$ $-2.25$ $-38.50$ $3.76$ $0.53$ $13.34$ $-1.34$ $-2.16$ $-0.21$ Table 16. The
$g_i$ couplings of the$10869.63+{\rm i}0$ state (generated dynamically in the VB sector with$J^P=\frac{1}{2}^-, \frac{3}{2}^-$ ) to various channels and$g_i \,G^{II}_i$ (in MeV).Let us look at the states formed from the pseudoscalar-baryon (
$ \frac{3}{2}^+ $ ) channels of Table 8. We find two states, shown in Tables 17 and 18. The first appears at$ 10447 $ MeV with a width of about$ 186 $ MeV. This state couples mostly to$ \Xi_{bb}^* \,\pi $ , which is open, justifying the large width. The second state appears at$ 10707 $ MeV and couples mostly to$ \Sigma_b^* \,\bar B $ . The$ \Xi_{bb}^* \,\pi $ channel is open, but the small coupling to this channel results in a very small width of this state.${\bf{10447.50+}}{\bf{i}}{\bf{93.31}}$ $\Xi_{bb}^* \,\pi$ $\Xi_{bb}^* \,\eta$ $\Omega_{bb}^* \, K$ $\Sigma_b^* \,\bar B$ $\Xi_b^*\,\bar B_s$ $g_i$ $1.69+{\rm i}1.21$ $-0.03-{\rm i}0.10$ $-0.87-{\rm i}0.73$ $-1.03-{\rm i}0.49$ $0.34+{\rm i}0.26$ $g_i\, G^{II}_i$ $-73.61-{\rm i}12.82$ $0.05+{\rm i}0.62$ $4.58+{\rm i}5.47$ $0.60+{\rm i}0.39$ $0.15-{\rm i}0.14$ Table 17. The
$g_i$ couplings of the$10447.50+{\rm i}93.31$ state (generated dynamically in the PB($\frac{3}{2}^+$ ) sector with$J^P=\frac{3}{2}^-$ ) to various channels and$g_i\,G^{II}_i$ (in MeV).${\bf{10706.87+}}{\bf{i}}{\bf{0.30}}$ $\Xi_{bb}^*\, \pi$ $\Xi_{bb}^*\, \eta$ $\Omega_{bb}^* \,K$ $\Sigma_b^* \,\bar B$ $\Xi_b^*\, \bar B_s$ $g_i$ $-0.01+{\rm i}0.09$ $0.19-{\rm i}0.03$ $0.08-{\rm i}0.07$ $19.01-{\rm i}0.01$ $-10.79+{\rm i}0.01$ $g_i \,G^{II}_i$ $-3.04-{\rm i}1.20$ $-2.55+{\rm i}0.35$ $-1.06+{\rm i}0.91$ $-18.75-{\rm i}0.01$ $7.25+{\rm i}0.01$ Table 18. The
$g_i$ couplings of the$10706.87+{\rm i}0.30$ state (generated dynamically in the PB($\frac{3}{2}^+$ ) sector with$J^P=\frac{3}{2}^-$ ) to various channels and$g_i\,G^{II}_i$ (in MeV).Finally, we consider the only "
$ \Omega_{bbb} $ " state found from the coupled channels of Table 10. This state is at$ 15212 $ MeV and couples mostly to$ \Xi_{bb}^*\, \bar B $ , as shown in Table 19. All coupled channels are closed and we obtain a zero width for this state.${\bf{15212.04+}}{\bf{i}}{\bf{0}}$ $\Omega_{bbb}\,\eta$ $\Xi_{bb}^* \,\bar B$ $\Omega_{bb}^*\, \bar B_s$ $g_i$ $0.15$ $14.03$ $-9.82$ $g_i \,G^{II}_i$ $-1.44$ $-18.31$ $8.80$ Table 19. The
$g_i$ couplings of the$15212.04+{\rm i}0$ state (generated dynamically in the PB($\frac{3}{2}^+$ ) sector with$J^P=\frac{3}{2}^-$ and three b quarks) to various channels and$g_i \,G^{II}_i$ (in MeV).In summary, we obtained two excited
$ \Xi_{bb} $ states with$ J^P = \frac{1}{2}^- $ coupled to the pseudoscalar-baryon ($ \frac{1}{2}^+ $ ) channels, three states with$ J^P = \frac{1}{2}^-, \frac{3}{2}^- $ , degenerate in our approach, coupled to the vector-baryon ($ \frac{1}{2}^+ $ ) channels, two states with$ J^P = \frac{3}{2}^- $ coupled to the pseudoscalar-baryon ($ \frac{3}{2}^+ $ ) channels, and found only one state corresponding to an excited$ \Omega_{bbb} $ state, coupled to the pseudoscalar-baryon ($ \frac{3}{2}^+ $ ) channels.We used the mass of the
$ \Omega_{bbb} $ ground state from Ref. [13],$ 14834 $ MeV. This is quite different from the Lattice QCD calculations in Ref. [29],$ 14371 $ MeV, similar to Ref. [6]. Surprisingly, if we redo the calculations using this latter mass, we obtain a mass of the excited$ \Omega_{bbb} $ state of Table 19 which differs by less than 1 MeV from the former. The reason is that the obtained excited$ \Omega_{bbb} $ state is mostly a$ \Xi^*_{bb} \bar B $ molecule and the$ \Omega_{bbb}\eta $ channel plays a negligible role. This is due to the zero$ D_{ii} $ coefficient for$ \Omega_{bbb}\eta $ in Table 11, which indicates that there is no direct interaction in this channel. The negligible effect of this channel in the excited$ \Omega_{bbb} $ state can also be seen in the small coupling to this channel,$ 0.15 $ versus$ 14.03 $ for the coupling to the$ \Xi^*_{bb} \bar B $ channel. The latter channel is bound by about$ 300 $ MeV, which again is due to the scale of the masses and the large$ D_{ii} = -2 $ coefficient for the diagonal$ \Xi^*_{bb} \bar B \to \Xi^*_{bb} \bar B $ transition.
Ξbb and Ωbbb molecular states
- Received Date: 2019-12-25
- Available Online: 2020-06-01
Abstract: Using the vector exchange interaction in the local hidden gauge approach, which in the light quark sector generates the chiral Lagrangians and has produced realistic results for