Extremal effective curves and non-semiample line bundles on $\overline{\rm{M}}_{g,n}$

Daebeom Choi

arXiv:2511.02019·math.AG·December 9, 2025

Extremal effective curves and non-semiample line bundles on $\overline{\rm{M}}_{g,n}$

Daebeom Choi

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Abstract

We develop a new method for establishing the extremality in the closed cone of effective curves on the moduli space of curves and determine the extremality of many boundary $1$ -strata. As a consequence, by using a general criterion for non-semiampleness which extends Keel's argument, we demonstrate that a substantial portion of the cone of nef divisors of $\overline{M}_{g, n}$ is not semiample. As an application, we construct the first explicit example of a non-contractible extremal ray of the closed cone of effective curves on $\overline{M}_{3, n}$ . Our method relies on two main ingredients: (1) the construction of a new collection of nef divisors on $\overline{M}_{g, n}$ , and (2) the identification of a tractable inductive structure on the Picard group, arising from Knudsen's construction of $\overline{M}_{g, n}$ .

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TopicsAlgebraic Geometry and Number Theory · Geometric Analysis and Curvature Flows · Geometry and complex manifolds