Minimal model theorem for toric divisors

Abstract

Minimal model conjecture for a proper variety X is that if (X)≥ 0, then X has a minimal model with the abundance and if =-∞, then X is birationally equivalent to a variety Y which has a fibration Y Z with -KY relatively ample. In this paper, we prove this conjecture for a -regular divisor on a proper toric variety by means of successive contractions of extremal rays and flips of ambient toric variety. Furthermore, for such a divisor X with (X)≥ 0 we construct a projective minimal model with the abundance in a different way; by means of "puffing up" of the polytope, which gives an algorithm of a construction of a minimal model.

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