Equivalences of PDE systems associated to degenerate para-CR Structures: foundational aspects
Abstract
Let K = R or C. We study basic invariants of submanifolds of solutions M = \ y = Q(x,a,b)\ = \b = P(a,x,y)\ in coordinates x ∈ Kn≥slant 1, y ∈ K, a ∈ Km≥slant 1, b ∈ K under split-diffeomorphisms (x,y,a,b) \,\, ( f(x,y),\,g(x,y),\,(a,b),\,(a,b) ). Two Levi forms exist, and have the same rank r ≤slant (n,m). If M is k-nondegenerate with respect to parameters and l-nondegenerate with respect to variables, Aut(M) is a local Lie group of dimension: \[ \, Aut (M) \,\,≤slant\,\, n+1+2k+2l2k+2l\,\, \, \ (n+1),\, (m+1) \. \] Mainly, our goal is to set up foundational material addressed to CR geometers. We focus on n = m = 2, assuming r = 1. In coordinates (x,y,z, a,b,c), a local equation is: \[ z \,=\, c + xa + β\,xxb + β\,yaa + c\, Ox,y,a,b(2) + Ox,y,a,b,c(4), \] with β and β representing the two 2-nondegeneracy invariants at 0. The associated para-CR PDE system: \[ zy \,=\, (x,y,z,zx,zxx) \ \ \ \ \ \ \ \ \ \ \ \ \ \& \ \ \ \ \ \ \ \ \ \ \ \ \ zxxx \,=\, H(x,y,z,zx,zxx), \] satisfies Fzxx 0 from Levi degeneracy. We show in details that the hypothesis of 2-nondegeneracy with respect to variables is equivalent to Fzx zx ≠ 0. This gives CR-geometric meaning to the first two para-CR relative differential invariants encountered independently in arXiv:2003.08166 .
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