Homogeneous C21 Models
Abstract
Fels-Kaup (Acta Mathematica 2008) classified homogeneous hypersurfaces and discovered that they are all biholomorphic to tubes over some affinely homogeneous surface . The second and third authors in 2003.08166, by performing highly non-straightforward calculations, conducted the Cartan method of equivalence to classify homogeneous models of PDE systems related to such hypersurfaces . Kolar-Kossovskiy 1905.05629 and the authors 2003.01952 constructed a formal and a convergent Poincar\'e-Moser normal form for hypersurfaces . But this was only a first, preliminary step. Indeed, the invariant branching tree underlying Fels-Kaup's classification was still missing in the literature, due to computational obstacles. The present work applies the power series method of equivalence, confirms Fels-Kaup 2008, and finds a differential-invariant tree. To terminate the middle (thickest) branch, it is necessary to compute up to order with variables. Again, calculations, done by hand, are non-straightforward.
Cite
@article{arxiv.2104.09608,
title = {Homogeneous C21 Models},
author = {Wei-Guo Foo and Joel Merker and Pawel Nurowski and The-Anh Ta},
journal= {arXiv preprint arXiv:2104.09608},
year = {2021}
}