English

Sharp pointwise and uniform estimates for $\bar\partial$

Complex Variables 2023-05-10 v2

Abstract

We use weighted L2L^2-methods to obtain sharp pointwise estimates for the canonical solution to the equation ˉu=f\bar\partial u=f on smoothly bounded strictly convex domains and the Cartan classical domain domains when ff is bounded in the Bergman metric gg. We provide examples to show our pointwise estimates are sharp. In particular, we show that on the Cartan classical domains Ω\Omega of rank 22 the maximum blow up order is greater than logδΩ(z)-\log \delta_\Omega(z), which was obtained for the unit ball case by Berndtsson. For example, for IV(n)(n) with n3n \geq 3, the maximum blow up order is δ(z)1n2\delta(z)^{1 -{n \over 2}} because of the contribution of the Bergman kernel. Additionally, we obtain uniform estimates for the canonical solutions on the polydiscs, strictly pseudoconvex domains and the Cartan classical domains under stronger conditions on ff.

Keywords

Cite

@article{arxiv.1911.12072,
  title  = {Sharp pointwise and uniform estimates for $\bar\partial$},
  author = {Robert Xin Dong and Song-Ying Li and John N. Treuer},
  journal= {arXiv preprint arXiv:1911.12072},
  year   = {2023}
}

Comments

26 pages; final version to appear in Analysis & PDE

R2 v1 2026-06-23T12:28:49.416Z