Finiteness Theorems for Products and Symmetric Products of Hyperbolic Riemann Surfaces
Abstract
We prove that if X = X1 × … × Xn is a product of hyperbolic Riemann surfaces of finite type and Y = / is a complex manifold, where is a bounded simply-connected domain in Cm, then the space of dominant holomorphic mappings from X to Y is a finite set. As corollaries, we obtain the finiteness of the space of dominant holomorphic mappings into products and symmetric products of hyperbolic Riemann surfaces.
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