Classification of planar rational cuspidal curves. I. C**-fibrations

Abstract

To classify complex rational cuspidal curves E⊂eq P2 it remains to classify the ones with complement of log general type, i.e. the ones for which (KX+D)=2, where (X,D) is a log resolution of (P2,E). It is conjectured that (KX+12D)=-∞ and hence P2 E is C**-fibered, where C**=C1\0,1\, or -(KX+12D) is ample on some minimal model of (X,12D). Here we classify, up to a projective equivalence, those rational cuspidal curves for which the complement is C**-fibered. From the rich list of known examples only very few are not of this type. We also discover a new infinite family of bicuspidal curves with unusual properties.