Mathematical Research Letters

Volume 23 (2016)

Number 5

Local Fano–Mori contractions of high nef-value

Pages: 1247 – 1262

DOI: http://dx.doi.org/10.4310/MRL.2016.v23.n5.a1

Authors

Marco Andreatta (Dipartimento di Matematica, Universitá di Trento, Povo (TN), Italy)

Luca Tasin (Mathematical Institute, University of Bonn, Germany)

Abstract

Let $X$ be a variety with terminal singularities of dimension $n$. We study local contractions $f : X \to Z$ supported by a $\mathbb{Q}$-Cartier divisor of the type $K_X + \tau L$, where $L$ is an $f$-ample Cartier divisor and $\tau \gt 0$ is a rational number. Equivalently, $f$ is a Fano–Mori contraction associated to an extremal face in $\overline{NE(X)}_{KX + \tau L=0}$. We prove that, if $\tau \gt (n - 3) \gt 0$, the general element $X^{\prime} \in \lvert L \rvert$ is a variety with at most terminal singularities. We apply this to characterize, via an inductive argument, some birational contractions as above with $\tau \gt (n - 3) \geq 0$.

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Published 12 January 2017