On complex surfaces with 5 or 6 semistable singular fibers over P1

Abstract

Let f:X@>>> P1 be a fibered surface with fibers of genus g>1. If f is semistable and non isotrivial we prove that X of non negative Kodaira dimension implies that the number s of singular fibers is at least 5. Information about the nature of X if s=6,5 and g<6 is given. If f is any relatively minimal fibration we bound by below Kf2, the bound depending on g and the Kodaira dimension of X, a classification of rational surfaces with minimal Kf2 is given. Moreover, we prove several properties of positivity for the linear system KX+F (F a fibre of f). Examples of a K3 surfaces admitting a semistable fibration with s=6 and g=3 and of a surface of general type admitting a semistable fibration with s=7 and g=4 are provided.

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