Abstract:
We consider germs of holomorphic vector fields in $(\mathbb C^n,0), n\ge
3$, with non isolated singularities. We assume that the set of
singular points forms a submanifold of codimension 2, and the
sum of the nonzero eigenvalues of the linearization of the germs
at each singular point is zero. We give the orbital analytic
classification of generic germs of such type. It happens that
the formal classification is trivial, and the analytic one has
functional moduli, unlike the cases of dicritic and nondicritic
generic germs in $n=2$ with isolated and degenerated singularity
where the formal and analytical classification coincide [2],[3].
Joint work with Ortiz-Bobadilla, L. (UNAM, México);
Voronin, S. M. (CSU, Russia).
Language: English
References
Ortiz-Bobadilla, L.; Rosales-Gonzaléz, E.; Voronin, S. M., Analytic classification of foliations induced by germs of holomorphic vector fields in $(\mathbb C^n, 0)$ with nonisolated singularities
Ortiz-Bobadilla, L.; Rosales-Gonzaléz, E.; Voronin, S. M., “Rigidity theorems for generic holomorphic germs of dicritic foliations and vector fields in $(\mathbb C^2, 0)$”, Mosc. Math. J., 5:1 (2005), 171–206
Ortiz-Bobadilla, L.; Rosales-Gonzaléz, E.; Voronin, S. M., “Thom’s Problem for Degenerate Singular Points of Holomorphic Foliations in the Plane”, Mosc. Math. J., 12:4 (2012), 825–862
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