Weighted Sobolev Lp estimates for homotopy operators on strictly pseudoconvex domains with C2 boundary

Abstract

We derive estimates in a weighted Sobolev space Wk,pμ(D) for a homotopy operator on a bounded strictly pseudoconvex domain D of C2 boundary in n. As a result, we show that given any 2n < p < ∞, k > 1, q ≥ 1, and a -closed (0,q) form of class Wk,p(D), there exist a solution u to u = such that u ∈ Wk,p-(D) for any > 0. If k=1, then we can take p to be any value between 1 and ∞. In other words, the solution gains almost -derivative in a suitable sense.