Distributions, first integrals and Legendrian foliations
Abstract
We study germs of holomorphic distributions with "separated variables'. In codimension one, a well know example of this kind of distribution is given by the canonical contact structure on P2m+1 . Another example is the Darboux distribution, which gives the normal local form of any contact structure. Given a germ D of holomorphic distribution with separated variables in (Cn,0), we show that there exists , for some ∈ Z≥ 0 related to the Taylor coefficients of D, a holomorphic submersion HD: (Cn,0) → (C,0) such that D is completely non-integrable on each level of HD. Furthermore, we show that there exists a holomorphic vector field Z tangent to D, such that each level of HD contains a leaf of Z that is somewhere dense in the level. In particular, the field of meromorphic first integrals of Z and that of D are the same.
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