Abstract
The s -wave interaction of $ \bar{D}\Lambda_c$ , $ \bar{D} \Sigma_c$ , $ \bar{D}^{\ast}\Lambda_c$ , $ \bar{D}^{\ast}\Sigma_c$ and $ \bar{D}\Sigma_c^{\ast}$ , $ \bar{D}^{\ast}\Sigma_c^{\ast}$ , is studied within a unitary coupled channels scheme with the extended local hidden gauge approach. In addition to the Weinberg-Tomozawa term, several additional diagrams via the pion exchange are also taken into account as box potentials. Furthermore, in order to implement the full coupled channels calculation, some of the box potentials which mix the vector-baryon and pseudoscalar-baryon sectors are extended to construct the effective transition potentials. As a result, we have observed six possible states in several angular momenta. Four of them correspond to two pairs of admixture states, two of $ \bar{D}\Sigma_c-\bar{D}^{\ast}\Sigma_c$ with $ J = 1/2$ , and two of $ \bar{D}\Sigma_c^{\ast} - \bar{D}^{\ast}\Sigma_c^{\ast}$ with $ J = 3/2$ . Moreover, we find a $ \bar{D}^{\ast}\Sigma_c$ resonance which couples to the $ \bar{D}\Lambda_c$ channel and one spin degenerated bound state of $ \bar{D}^{\ast}\Sigma_c^{\ast}$ with $ J = 1/2,5/2$ .