On 1/2 estimate for global Newlander-Nirenberg theorem

Abstract

Given a formally integrable almost complex structure X defined on the closure of a bounded domain D ⊂ Cn, and provided that X is sufficiently close to the standard complex structure, the global Newlander-Nirenberg problem asks whether there exists a global diffeomorphism defined on D that transforms X into the standard complex structure, under certain geometric and regularity assumptions on D. In this paper we prove a quantitative result of this problem. Assuming D is a strictly pseudoconvex domain in Cn with C2 boundary, and that the almost structure X is of the H\"older-Zygmund class r( D) for r>32, we prove the existence of a global diffeomorphism (independent of r) in the class r+12-( D), for any >0.