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arxiv: 1007.0139 · v2 · pith:HL35FQKDnew · submitted 2010-07-01 · 🧮 math.CV

On the duality theorem on an analytic variety

classification 🧮 math.CV
keywords dualitytheoremanalyticcoleff-herreraconditionsvarietyannihilatorcases
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The duality theorem for Coleff-Herrera products on a complex manifold says that if $f = (f_1,\dots,f_p)$ defines a complete intersection, then the annihilator of the Coleff-Herrera product $\mu^f$ equals (locally) the ideal generated by $f$. This does not hold unrestrictedly on an analytic variety $Z$. We give necessary, and in many cases sufficient conditions for when the duality theorem holds. These conditions are related to how the zero set of $f$ intersects certain singularity subvarieties of the sheaf $\mathcal{O}_Z$.

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