Residues of holomorphic sections and lelong currents

Mats Andersson

doi:10.1007/BF02384777

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Home > Journals > Ark. Mat. > Volume 43 > Issue 2 > Article

October 2005 Residues of holomorphic sections and lelong currents

Mats Andersson

Author Affiliations +

Mats Andersson¹
¹Department of Mathematics, Chalmers University of Technology; the University of Göteborg

Ark. Mat. 43(2): 201-219 (October 2005). DOI: 10.1007/BF02384777

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Abstract

LetZ be the zero set of a holomorphic section f of a Hermitian vector bundle. It is proved that the current of integration over the irreducible components of Z of top degree, counted with multiplicities, is a product of a residue factor R^f and a “Jacobian factor”. There is also a relation to the Monge-Ampère expressions (dd^c log|f|)^k, which we define for all positive powers k.