A note on the cone of mobile curves
classification
🧮 math.AG
keywords
coneclassesconjecturecurvesmobileassumingboucksomclosed
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S. Boucksom, J.-P. Demailly, M. Paun and Th. Peternell proved that the cone of mobile curves ME(X) of a projective complex manifold X is dual to the cone generated by classes of effective divisors and conjectured an extension of this duality in the Kaehler set-up. We show that their conjecture implies that ME(X) coincides with the cone of integer classes represented by closed positive smooth (n-1,n-1)-forms. Without assuming the validity of the conjecture we prove that this equality of cones still holds at the level of degree functions.
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