Slopes of fibrations with trivial vertical fundamental groups

Abstract

Kodaira fibrations have non-trivial vertical fundamental groups and their slopes are all 12. In this paper, we show that 12 is indeed the sharp upper bound for the slopes of fibrations with trivial vertical fundamental groups. Precisely, for each g≥3 we prove the existence of fibrations of genus g with trivial vertical fundamental groups whose slopes can be arbitrarily close to 12. This gives a relative analogy of Roulleau-Urz\'ua's work on the slopes of surfaces of general type with trivial fundamental groups.

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