Arithmetic Demailly Approximation Theorem
Abstract
We generalize the Demailly approximation theorem from complex geometry to Arakelov geometry.As an application, let X/Q be an integral projective variety and N be an adelic line bundle on X, we prove that ess( N) ≥ 0 N pseudo-effective. This was proved in [Bal21], assuming N relatively semipositive. We show in the appendix that the above assertion is also true for adelic line bundles on quasi-projective varieties, under the framework of [YZ22].
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