Fundamental Group of some Genus-2 Fibrations and Applications
Abstract
We will prove that given a genus-2 fibration f: X → C on a smooth projective surface X such that b1(X)=b1(C)+2, the fundamental group of X is almost isomorphic to π1(C) × π1(E), where E is an elliptic curve. We will also verify the Shafarevich Conjecture on holomorphic convexity of the universal cover of surfaces X with genus-2 fibration X→ C such that b1(X)>b1(C).
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