Let $D$ be a very ample divisor in $X$ projective variety. I can't understand why the first chern class $c_1(\mathscr{O}_X(D))$ equals the Poincarè dual of D, $\mathscr{P}(D)$
About first Chern class and Poincaré duality in case of an ample divisor
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algebraic-geometry
algebraic-topology
1 Answers
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Over the complex numbers this is the content of Proposition 4.4.13 in Huybrecht's book "Complex Geometry".
There this is proven for any divisor $D$ in any compact complex manifold $X$.
Were you explicitely looking for the general result?