H\"ormander's solution of the ∂ -equation with compact support

Abstract

This work is a complement of the study on H\"ormander's solution of the ∂ equation initialised by H. Hedenmalm. Let be a strictly plurisubharmonic function of class C 2 in C n, let c(z) be the smallest eigenvalue of i∂∂ then ∀ z∈Cn, c (z)>0. We denote by L2p,q(Cn, e) the (p, q) currents with coefficients in L2p,q(Cn, e). We prove that if ω∈ L2p,q(Cn,e), ∂ω = 0 for q <n then there is a solution u ∈ L 2p,q-1(Cn,c e) of ∂u = ω. This is done via a theorem giving a solution with compact support if the data has compact support.