In this paper, we study the exact physical quantities in the thermodynamic limit of the one-dimensional Hubbard model with unparallel boundary magnetic fields based on the off-diagonal Bethe ansatz solution. At the half-filling, we obtain the different patterns of Bethe roots of the reduced Bethe ansatz equations for the different boundary parameters. According to them, we obtain the densities of states, ground state energy density and surface energy. Our results show that the system has the stable boundary bound states when the boundary magnetic fields satisfy some constraints.
Comment: 13 pages, 3 figures