The zero locus of the infinitesimal invariant
classification
🧮 math.AG
keywords
locuszeroinfinitesimalinvariantadmissiblebundlecomplexconstructible
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Let {\nu} be a normal function on a complex manifold X. The infinitesimal invariant of {\nu} has a well-defined zero locus inside the tangent bundle TX. When X is quasi-projective, and {\nu} is admissible, we show that this zero locus is constructible in the Zariski topology.
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