Determination of a homogeneous strictly pseudoconvex surface from the coefficients of its normal equation (Q1886112)

Let \(M\) be a real analytic strictly pseudoconvex hypersurface in \(\mathbb C^3\). Assume that \(M\) is locally homogeneous at \(p\in M\), i.e. that there is a local Lie group \(G\), consisting of local biholomorphic maps of \(\mathbb C^3\) defined near \(p\), which acts transitively near \(p\). The author shows that the holomorphic equivalent class of \(M\) is determined by the coefficients of order no higher than 7 in the Chern-Moser normal form, or by the coefficients of order no higher than 6 when \(M\) has a non discrete isotropy group at \(p\). The author obtains a complete classification when \(M\) has a 1-dimensional isotropy group.