Exact Solution to Interacting Kitaev Chain at Symmetric Point

Kitaev chain model with nearest neighbor interaction U is solved exactly at the symmetry point $\Delta=t$ and chemical potential $\mu=0$ in open boundary condition. By applying two Jordan-Wigner transformations and a spin-rotation, such a symmetric interacting model is mapped to a non-interacting fermion model, which can be diagonalized exactly. The solutions include topologically non-trivial phase at U$<$t and topologically trivial phase at U$>$t. The two phases are related by dualities. Quantum phase transitions in the model are studied with the help of the exact solution.