We study the universal covering space $\tilde M$ of a holomorphic family (M, π, R) of Riemann surfaces over a Riemann surface R. The main result is that (1) $\tilde M$ is topologically equivalent to a two-dimensional cell, (2) $\tilde M$ is analytically equivalent to a bounded domain in C2, (3) $\tilde M$ is not analytically equivalent to the two-dimensional unit ball B2 under a certain condition, and (4) $\tilde M$ is analytically equivalent to the two-dimensional polydisc Δ2 if and only if the homotopic monodoromy group of (M, π, R) is finite.