Rigid equivalences of 5-dimensional 2-nondegenerate rigid real hypersurfaces M5 ⊂ C 3 of constant Levi rank 1

Abstract

We study the local equivalence problem for real-analytic (Cω) hypersurfaces M5 ⊂ C3 which, in coordinates (z1, z2, w) ∈ C3 with w = u+i\, v, are rigid: \[ u \,=\, F(z1,z2,z1,z2), \] with F independent of v. Specifically, we study the group Hol rigid(M) of rigid local biholomorphic transformations of the form: \[ (z1,z2,w) ( f1(z1,z2), f2(z1,z2), a\,w + g(z1,z2) ), \] where a ∈ R \0\ and D(f1,f2)D(z1,z2) ≠ 0, which preserve rigidity of hypersurfaces. After performing a Cartan-type reduction to an appropriate \e\-structure, we find exactly two primary invariants I0 and V0, which we express explicitly in terms of the 5-jet of the graphing function F of M. The identical vanishing 0 I0 ( J5F ) V0 ( J5F ) then provides a necessary and sufficient condition for M to be locally rigidly-biholomorphic to the known model hypersurface: \[ M LC \ \ \ \ \ u \,=\, z1\,z1 +12\,z12z2 +12\,z12z2 1-z2z2. \] We establish that \, Hol rigid (M) ≤ 7 = \, Hol rigid ( M LC ) always. If one of these two primary invariants I0 0 or V0 0 does not vanish identically, we show that this rigid equivalence problem between rigid hypersurfaces reduces to an equivalence problem for a certain 5-dimensional \e\-structure on M.