In this paper we investigate the numerical properties of relatively minimal isotrivial fibrations φ: X → C, where X is a smooth, projective surface and C is a curve. In particular we prove that, if g(C) ≥ 1 and X is neither ruled nor isomorphic to a quasi-bundle, then; this inequality is sharp and if equality holds then X is a minimal surface of general type whose canonical model has precisely two ordinary double points as singularities. Under the further assumption that KX is ample, we obtain and the inequality is also sharp. This improves previous results of Serrano and Tan. © 2010 Springer Science+Business Media B.V.
CITATION STYLE
Polizzi, F. (2010). Numerical properties of isotrivial fibrations. Geometriae Dedicata, 147(1), 323–355. https://doi.org/10.1007/s10711-010-9457-z
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