Normal Forms for Rigid $\mathfrak{C}_{2,1}$ Hypersurfaces $M^5 \subset \mathbb{C}^3$
Abstract
Consider a -nondegenerate constant Levi rank rigid hypersurface in coordinates : The Gaussier-Merker model was shown by Fels-Kaup 2007 to be locally CR-equivalent to the light cone . Another representation is the tube . Inspired by Alexander Isaev, we study rigid biholomorphisms: The G-M model has 7-dimensional rigid automorphisms group. A Cartan-type reduction to an e-structure was done by Foo-Merker-Ta in 1904.02562. Three relative invariants appeared: , (primary) and (derived). In Pocchiola's formalism, Section 8 provides a finalized expression for . The goal is to establish the Poincar\'e-Moser complete normal form: with and . We apply the method of Chen-Merker 1908.07867 to catch (relative) invariants at every point, not only at the central point, as the coefficients , , . With this, a brige Poincar\'e Cartan is constructed. In terms of , the numerators of , , incorporate 11, 52, 824 differential monomials.
Keywords
Cite
@article{arxiv.1912.01655,
title = {Normal Forms for Rigid $\mathfrak{C}_{2,1}$ Hypersurfaces $M^5 \subset \mathbb{C}^3$},
author = {Zhangchi Chen and Wei-Guo Foo and Joel Merker and The-Anh Ta},
journal= {arXiv preprint arXiv:1912.01655},
year = {2020}
}
Comments
This work was supported in part by the Polish National Science Centre (NCN) via the grant number 2018/29/B/ST1/02583