English

Regularity for the CR vector bundle problem II

Complex Variables 2009-11-25 v1

Abstract

We derive a Ck+\yt\mathcal C^{k+\yt} H\"older estimate for PϕP\phi, where PP is either of the two solution operators in Henkin's local homotopy formula for ˉb\bar\partial_b on a strongly pseudoconvex real hypersurface MM in Cn\mathbf C^{n}, ϕ\phi is a (0,q)(0,q)-form of class Ck\mathcal C^{k} on MM, and k0k\geq0 is an integer. We also derive a Ca\mathcal C^{a} estimate for PϕP\phi, when ϕ\phi is of class Ca\mathcal C^{a} and a0a\geq0 is a real number. These estimates require that MM be of class Ck+5/2\mathcal C^{k+{5/2}}, or Ca+2\mathcal C^{a+2}, respectively. The explicit bounds for the constants occurring in these estimates also considerably improve previously known such results. These estimates are then applied to the integrability problem for CR vector bundles to gain improved regularity. They also constitute a major ingredient in a forthcoming work of the authors on the local CR embedding problem.

Keywords

Cite

@article{arxiv.0911.4549,
  title  = {Regularity for the CR vector bundle problem II},
  author = {Xianghong Gong and S. M. Webster},
  journal= {arXiv preprint arXiv:0911.4549},
  year   = {2009}
}
R2 v1 2026-06-21T14:15:15.527Z