Lefschetz pencils and finitely presented groups
Abstract
In this paper, given a finitely presented group , we provide the explicit monodromy of a Lefschetz fibration with (-1)-sections whose total space has fundamental group by applying "twisted substitutions" to that of the Lefschetz fibration constructed by Cadavid and independently Korkmaz. Consequently, we obtain an upper bound for the minimum g such that there exists a genus-g Lefschetz pencil on a smooth 4-manifold whose fundamental group is isomorphic to .
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