The sphere in \(\mathbf{C}^2\) as a model surface for degenerate hypersurfaces in \(\mathbf{C}^3\)
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Publication:259921
DOI10.1134/S1061920815040020zbMath1345.32036OpenAlexW2261322292MaRDI QIDQ259921
I. G. Kossovskii, Valeriĭ K. Beloshapka
Publication date: 18 March 2016
Published in: Russian Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1134/s1061920815040020
Related Items (3)
A complete normal form for everywhere Levi-degenerate hypersurfaces in \(\mathbb{C}^3\) ⋮ Lie-Cartan differential invariants and Poincaré-Moser normal forms: Conflunces ⋮ On CR maps from the sphere into the tube over the future light cone
Cites Work
- Reduction of five-dimensional uniformly Levi degenerate CR structures to absolute parallelisms
- Representation of the group of holomorphic symmetries of a real germ in the symmetry group of its model surface
- Classification of Levi degenerate homogeneous CR-manifolds in dimension 5
- Real hypersurfaces in complex manifolds
- Symmetries of real hypersurfaces in complex 3-space
- CR-manifolds of dimension 5: A Lie algebra approach
- Normal forms and biholomorphic equivalence of real hypersurfaces in C^3
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