Solutions of the ∂ -equation on Stein and on K\"ahler manifold with compact support

Abstract

We study the ∂ -equation first in Stein manifold then in complete K\"ahler manifolds. The aim is to get Lr and Sobolev estimates on solutions with compact support. In the Stein case we get that for any (p,q)-form ω in Lr with compact support and ∂ -closed there is a (p,q-1)-form u in W1,r with compact support and such that ∂ u=ω . In the case of K\"ahler manifold, we prove and use estimates on solutions on Poisson equation with compact support and the link with ∂ equation is done by a classical theorem stating that the Hodge laplacian is twice the ∂ (or Kohn) Laplacian in a K\"ahler manifold. This uses and improves, in special cases, our result on Andreotti-Grauert type theorem.