Estimates Lr-Ls for solutions of the ∂ equation in strictly pseudo convex domains in Cn.

Abstract

We prove estimates for solutions of the ∂ u=ω equation in a strictly pseudo convex domain in Cn. For instance if the (p,q) current ω has its coefficients in Lr( ) with 1≤ r<2(n+1) then there is a solution u in Ls( ) with \ 1s=1r-12(n+1). We also have BMO and Lipschitz estimates for r≥ 2(n+1). These results were already done by S. Krantz in the case of (0,1) forms and just for the Lr-Ls part by L. Ma and S. Vassiliadou for general (p,q) forms. To get the complete result we propose another approach, based on Carleson measures of order α and on the subordination lemma.