Affine Rigidity Without Integration

Abstract

Real analytic (Cω) surfaces S2 in R3 (x,y,u) graphed as \ u = F(x,y) \ with Fxx ≠ 0 whose Gaussian curvature vanishes identically: \[ 0 \,\, Fxx\,Fyy - Fxy2, \] possess, under the action of the affine transformation group Aff3(R) = GL3(R) R3, a basic invariant analogous to 2-nondegeneracy for Cω real hypersurfaces M5 ⊂ C3: \[ S aff \,:=\, Fxx\,Fxxy-Fxy\,Fxxx Fxx2. \] It is known (or easily recovered) that S is affinely equivalent to \ u = x2 \ if and only if S aff 0. Assuming that S aff ≠ 0 everywhere, two deeper affine invariants inspired from Pocchiola's Ph.D. are W aff and J aff. Explicit expressions are given in this article. Theorem. S is affinely equivalent to \ u = x21-y \ if and only if W aff 0 J aff. As a direct corollary of the (brief) proof, affine rigidity of CR-flat 2-nondegenerate Cω Levi rank 1 hypersurfaces M5 ⊂ C3 is deduced. The arguments rely on pure affine geometry, avoid any tool from Analysis, and simplify A.V. Isaev, J. Differential Geom. 104 (2016), 111--141. An independent article will show, in a more general context, how C∞ (even C7) F(x,y) can be handled.