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On the degree of Polar Transformations -- An approach through Logarithmic Foliations

We investigate the degree of the polar transformations associated to a certain class of multi-valued homogeneous functions. In particular we prove that the degree of the pre-image of generic linear spaces by a polar transformation associated to a homogeneous polynomial $F$ is determined by the zero locus of $F$. For zero dimensional-dimensional linear spaces this was conjecture by Dolgachev and proved by Dimca-Papadima using topological arguments. Our methods are algebro-geometric and rely on the study of the Gauss map of naturally associated logarithmic foliations.

preprint2007arXivOpen access
Thiago FassarellaJorge Vitório Pereira
math.AG
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Thiago FassarellaJorge Vitório Pereira

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