Bers' simultaneous uniformization and the intersection of Poincare holonomy varieties

Abstract: We consider the space of ordered pairs of distinct $\mathbb{C}P^1$-structures on Riemann surfaces (of any orientations) which have identical holonomy, so that the quasi-Fuchsian space is identified with a connected component of this space. This space holomorphically maps to the product of the Teichm\"uller spaces minus its diagonal. In this paper, we prove that this mapping is a complete local branched covering map. As a corollary, we reprove Bers' simultaneous uniformization theorem without any quasi-conformal deformation theory. Our main theorem is that the intersection of arbitrary two Poincar\'e holonomy varieties (${\rm SL}_2\mathbb{C}$-opers) is a non-empty discrete set, which is closely related to the mapping.