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Flips arising as quotients of hypersurfaces

Published online by Cambridge University Press:  01 July 1999

GAVIN BROWN
Affiliation:
Jesus College, Oxford, OX1 3DW, UK; e-mail: [email protected]

Abstract

Flips occur in the theory of minimal models of algebraic varieties. For an introduction and references see [1, lecture no. 5]. For varieties X and X+, I denote the canonical class by K and respectively. A flip is a diagram XXX+ of normal complex quasiprojective 3-folds satisfying the conditions:

1. both morphisms are birational and projective, contracting only finitely many curves C±X± to an isolated singular point PX;

2. the divisors −K and K+ are relatively ample, that is, −KΓ>0 for any curve Γ contracted by the morphism XX and similarly for K+;

3. the two varieties X and X+ have only terminal singularities.

A diagram satisfying condition 1 is called a flip diagram. It is said to be directed by the canonical class if it also satisfies condition 2. Notice that condition 3 is overstated since under all the other conditions X+ will automatically have terminal singularities (see [4, 5-1-11(2)]).

Type
Research Article
Copyright
The Cambridge Philosophical Society 1999

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