English

A Dolbeault lemma for temperate currents

Complex Variables 2020-10-22 v4

Abstract

We consider a bounded open Stein subset Ω\Omega of a complex Stein manifold XX of dimension nn. We prove that if ff is a current on XX of bidegree (p,q+1)(p,q+1), ˉ\bar\partial-closed on Ω\Omega, we can find a current uu on XX of bidegree (p,q)(p,q) which is a solution of the equation ˉu=f\bar\partial u=f in Ω\Omega. In other words, we prove that the Dolbeault complex of temperate currents on Ω\Omega (i.e. currents on Ω\Omega which extend to currents on XX) is concentrated in degree 00. Moreover if ff is a current on X=CnX= C^n of order kk, then we can find a solution uu which is a current on CnC^n of order k+2n+1k+2n+1.

Cite

@article{arxiv.2003.11437,
  title  = {A Dolbeault lemma for temperate currents},
  author = {Henri Skoda},
  journal= {arXiv preprint arXiv:2003.11437},
  year   = {2020}
}
R2 v1 2026-06-23T14:26:55.999Z