Cowen-Douglas Operator and Shift on Basis

In this paper we show a Cowen-Douglas operator $T \in \mathcal{B}_{n}(\Omega)$ is the adjoint operator of some backward shift on a general basis by choosing nice cross-sections of its complex bundle $E_{T}$. Using the basis theory model, we show that a Cowen-Douglas operator never be a shift on some Markushevicz basis for $n \ge 2$.