▎ 摘　　要

Broken-symmetry quantum Hall (QH) states with filling factors nu = 0, +/- 1, +/- 2, +/- 3 in the lowest Landau level in bilayer graphene are analyzed by solving the gap equation in the random phase approximation. It is shown that in the plane of electric and magnetic fields, the critical line, which separates the spin-and layer-polarized phases at nu = 0, extends to the nu = +/- 1 QH states. The amplitudes of the gaps in the nu = +/- 1, +/- 3, and nu = +/- 2 QH states are significantly smaller than the amplitude of the nu = 0 gap, due to the separate filling of the n = 0 and n = 1 orbital Landau levels and the negative contribution of the Hartree term, respectively. It is shown that those values of the external electric field where the conductance is not quantized correspond to the minima of the gaps.