Nonvanishing and Abundance for cones of movable divisors

Abstract

Let Movk(X) be the closure of the cone Movk(X) generated by classes of effective divisors on a projective variety X with stable base locus of codimension at least k+1. We propose a generalized version of the Log Nonvanishing Conjecture and of the Log Abundance Conjecture for a klt pair (X,), that is: if KX+ ∈ Movk(X), then KX+ ∈ Movk(X). Moreover, we prove that if the Log Minimal Model Program, the Log Nonvanishing, and the Log Abundance hold, then so does our conjecture.

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