Non-elementary Fano conic bundles

Abstract

We study a particular kind of fiber type contractions between complex, projective, smooth varieties f:X->Y, called Fano conic bundles. This means that X is a Fano variety, and every fiber of f is isomorphic to a plane conic. Denoting by rhoX the Picard number of X, we investigate such contractions when rhoX-rhoY is greater than 1, called non-elementary. We prove that rhoX-rhoY is at most 8, and we deduce new geometric information about our varieties, depending on rhoX-rhoY. Moreover, when X is locally factorial with canonical singularities and with at most finitely many non-terminal points, we consider fiber type KX-negative contractions f:X->Y with one-dimensional fibers, and we show that rhoX-rhoY is at most 9.